Regur_VV0 regurgitate-arianism_JJ you_PPY watch_VV0 ._. 
Ca_VM n't_XX find_VVI it_PPH1 ._. 
._. They_PPHS2 're_VBR probably_RR looked_VVN out_RP or_CC something_PN1 the_AT key_NN1 ._. 
Well_RR ._. 
Hello_UH ,_, hiya_UH ,_, ._. 
Do_VD0 n't_XX do_VDI phone_NN1 calls._NN2 made_VVD your_APPGE ._. 
International_JJ Longmans_NP2 Dictionary_NN1 ._. 
Really_RR got_VVN a_AT1 thing_NN1 really_RR ._. 
Have_VH0 any_DD ?_? 
I_PPIS1 think_VV0 actually_RR ask_VV0 them_PPHO2 ._. 
Oh_UH ,_, I_PPIS1 see_VV0 ._. 
Oh_UH we_PPIS2 've_VH0 been_VBN ._. 
What_DDQ with_IW the_AT mileage_NN1 ._. 
Yeah_UH ._. 
Yes_UH ._. 
Right_RR ._. 
Mm_UH ._. 
Oh_UH ._. 
Yeah_UH that_CST ,_, that_DD1 's_VBZ where_RRQ you_PPY ._. 
Mm._NNU gon_NN1 na_FW ring_VV0 then_RT cos_CS I_PPIS1 'm_VBM ,_, I_PPIS1 'm_VBM not_XX staying_VVG like_II this_DD1 ._. 
Oh_UH alright_RR then_RT ,_, ._. 
Oh_UH sorry_JJ ._. 
What_DDQ ?_? 
That_DD1 tiggles_VVZ ._. 
Tiggles_NN2 ?_? 
Yeah_UH ,_, what_DDQ else_RR ._. 
Tickles_NN2 ,_, not_XX tiggles_NN2 ._. 
It_PPH1 's_VBZ C_ZZ1 ,_, K._NP1 Alright_RR ._. 
Not_XX G_NP1 ,_, tickles_NN2 ._. 
Yeah_UH ,_, it_PPH1 's_VBZ very_RG flash_JJ then_RT ._. 
Yeah_UH .._... 
What_DDQ ?_? 
Have_VH0 a_AT1 nice_JJ three_MC piece_NN1 suite_NN1 for_IF you_PPY ._. 
Take_VV0 it_PPH1 Not_XX Lucky_JJ oh_UH ,_, ._. 
Sean_NP1 Connery_NP1 ?_? 
That_DD1 on_II there_RL ,_, see_VV0 ?_? 
Mhm_UH ._. 
Good_JJ ._. 
Come_VV0 through_RP ._. 
That_DD1 's_VBZ disgusting_JJ ._. 
Why_RRQ ?_? 
Right_RR ._. 
Yeah_UH it_PPH1 'll_VM have_VHI to_TO be_VBI count_NN1 ._. 
It_PPH1 's_VBZ out_II21 of_II22 order_NN1 ._. 
Yeah_UH ,_, I_PPIS1 know_VV0 ._. 
Get_VV0 on_RP to_II ._. 
I_PPIS1 'm_VBM gon_NN1 na_FW grow_VV0 erm_FU ,_, because_CS I_PPIS1 could_VM Yeah_UH ,_, she_PPHS1 's_VHZ got_VVN eyes_NN2 like_VV0 ,_, she_PPHS1 ._. 
Did_VDD she_PPHS1 ?_? 
Woman_NN1 ._. 
I._NP1 It_PPH1 's_VBZ covered_VVN ._. 
I_PPIS1 meant_VVD cut_VV0 the_AT erm_FU ,_, ._. 
So_RR I_PPIS1 've_VH0 given_VVN you_PPY five_MC ._. 
Think_VV0 you_PPY can_VM alright_RR ?_? 
Yeah_UH ._. 
Yeah_UH I_PPIS1 'll_VM get_VVI around_RP to_II it_PPH1 ._. 
Darling_NN1 ._. 
I_PPIS1 will_VM ,_, honest_JJ You_PPY ._. 
I._NP1 Hi_UH Eric_NP1 ._. 
Yeah_UH ._. 
Nor_CC for_IF the_AT fun_NN1 of_IO like_JJ ._. 
I_PPIS1 have_VH0 ._. 
Mm_UH ._. 
Right_RR ._. 
What_DDQ is_VBZ it_PPH1 I._NP1 It_PPH1 's_VBZ dark_JJ and_CC ._. 
No_UH ._. 
It._NP1 chance_NN1 to_TO see_VVI him_PPHO1 in_RP ._. 
Erm_FU ,_, actually_RR he_PPHS1 's_VBZ darker_JJR than_CSN ,_, it_PPH1 's_VBZ yellow_JJ ._. 
Mm_UH ._. 
._. It_PPH1 's_VBZ yellow_JJ ._. 
No_UH ,_, it_PPH1 's_VBZ me_PPIO1 doing_VDG that_DD1 not_XX someone_PN1 else_RR ._. 
What_DDQ ?_? 
Nothing_PN1 ._. 
Oh_UH ._. 
Sorry_JJ eh_UH ._. 
What_DDQ ?_? 
._. I_PPIS1 'm_VBM not_XX gon_NN1 na_FW shave_VV0 that_CST for_IF three_MC weeks_NNT2 ._. 
That_DD1 'll_VM look_VVI nice_JJ ._. 
No_UH that_CST ,_, that_DD1 is_VBZ right_RR really_RR threatening_VVG ._. 
Yes_UH ._. 
Think_VV0 you_PPY 're_VBR hard_JJ ?_? oh_UH my_APPGE god_NN1 ._. 
Well_RR hard_JJ ._. 
That_DD1 was_VBDZ well_JJ funny_JJ last_MD time_NNT1 ,_, you_PPY see_VV0 me_PPIO1 in_II a_AT1 room_NN1 ,_, we_PPIS2 're_VBR playing_VVG er_FU games_NN2 ._. 
I_PPIS1 ,_, I_PPIS1 say_VV0 a_AT1 word_NN1 Yeah._NP1 and_CC ,_, and_CC you_PPY ,_, you_PPY have_VH0 to_TO say_VVI another_DD1 word_NN1 that_CST sounds_VVZ like_II it_PPH1 ._. 
Yeah_UH ._. 
And_CC eh_UH ,_, like_II I_ZZ1 ,_, if_CS I_PPIS1 say_VV0 loverks_NN2 Mm_NNU ._. 
You_PPY say_VV0 bloverks_NN2 ,_, souverks_NN2 ,_, ._. 
proper_JJ words_NN2 ._. 
No_UH you_PPY ,_, we_PPIS2 're_VBR doing_VDG it_PPH1 ,_, well_RR this_DD1 a_AT1 large_JJ ._. 
Mm_UH ._. 
Mm_UH ,_, ca_VM n't_XX imagine_VVI this_DD1 ._. 
You_PPY has_VHZ to_TO come_VVI down_RP ._. 
It_PPH1 's_VBZ really_RR funny_JJ ,_, oh_UH ._. 
When_CS we_PPIS2 were_VBDR in_II the_AT room_NN1 it_PPH1 smelled_VVD ,_, cos_CS Si_FW ,_, Dave_NP1 ,_, Jolly_JJ ._. 
Mm_UH ._. 
,_, Colin_NP1 ,_, someone_PN1 else_RR ,_, Johnny_NP1 ._. 
There_EX 's_VBZ her_APPGE poxy_JJ car_NN1 keys_NN2 ._. 
Is_VBZ he_PPHS1 alright_JJ there_RL ?_? 
Yeah_UH ._. 
Right_RR I_PPIS1 've_VH0 taken_VVN her_PPHO1 out_RP to_II lunch_NN1 ._. 
Yes_UH ,_, right_RR ._. 
What_DDQ 's_VBZ that_DD1 ?_? 
Du_FW n_ZZ1 no_NN1 ._. 
I_PPIS1 tried_VVD to_TO get_VVI one_PN1 yesterday_RT ,_, ._. 
Eh_UH ?_? 
I_PPIS1 chance_VV0 to_TO ._. 
Where_RRQ 'd_VM you_PPY try_VVI ?_? 
Down_II the_AT road_NN1 I_PPIS1 think_VV0 ._. 
Sainsbury_NP1 's_GE ._. 
You_PPY might_VM I_PPIS1 did_VDD n't_XX think_VVI you_PPY 'll_VM mind_VVI having_VHG scrambled_VVN eggs_NN2 with_IW toast_NN1 anyway_RR ._. 
Lovey_NN1 dovey_NN1 ,_, ._. 
You_PPY get_VV0 more_DAR eggs_NN2 this_DD1 way_NN1 ,_, you_PPY get_VV0 two_MC eggs_NN2 this_DD1 way._NN1 ,_, preferred_VVD the_AT other_JJ way_NN1 ._. 
Not_XX that_DD1 ._. 
Yeah_UH ,_, but_CCB you_PPY 're_VBR only_RR giving_VVG us_PPIO2 the_AT ._. 
If_CS you_PPY always_RR feel_VV0 hungry_JJ what_DDQ is_VBZ the_AT point_NN1 ?_? 
What_DDQ diet_VV0 ?_? 
She_PPHS1 's_VBZ lost_VVN two_MC and_CC a_AT1 half_NN1 stone_NN1 within_RL about_RG two_MC or_CC three_MC months_NNT2 ._. 
Ha_UH ,_, what_DDQ diet_NN1 's_VBZ she_PPHS1 on_II ?_? 
Yeah_UH ,_, she_PPHS1 works_VVZ on_II this_DD1 special_JJ diet_NN1 plan_NN1 ,_, special_JJ diet_NN1 and_CC what_DDQ have_VH0 you_PPY ._. 
I_PPIS1 said_VVD well_RR how_RRQ do_VD0 you_PPY manage_VVI to_TO keep_VVI the_AT weight_NN1 off_RP ?_? 
Well_RR she_PPHS1 said_VVD I_PPIS1 've_VH0 done_VDN a_RR21 bit_RR22 ._. 
Why_RRQ no_RR I_PPIS1 've_VH0 never_RR seen_VVN you_PPY two_MC She_PPHS1 is_VBZ ,_, she_PPHS1 is_VBZ jealous_JJ at_II having_VHG a_AT1 dig_NN1 at_II her_PPHO1 ._. 
No_UH ,_, no_UH ,_, I_PPIS1 wo_VM n't_XX ,_, I_PPIS1 'm_VBM ,_, I_PPIS1 'm_VBM Pretty_RG cold_JJ ._. 
If_CS ,_, if_CS she_PPHS1 had_VHD believed_VVN the_AT aim_NN1 to_TO keep_VVI it_PPH1 off_RP ,_, I_PPIS1 would_VM 've_VHI been_VBN jealous_JJ ,_, but_CCB she_PPHS1 ,_, she_PPHS1 's_VBZ not_XX going_VVGK to_TO find_VVI it_PPH1 easy_JJ to_TO keep_VVI her_APPGE weight_NN1 ,_, she_PPHS1 's_VBZ out_RP here_RL when_CS she_PPHS1 's_VBZ put_VVN back_RP on_II pound_NN1 ._. 
She_PPHS1 's_VBZ tried_VVN ._. 
What_DDQ says_VVZ you_PPY 're_VBR ._. 
Yeah_UH so_RR am_VBM I._NP1 Pardon_NN1 ?_? 
So_RR am_VBM I_PPIS1 what_DDQ I_PPIS1 've_VH0 left_VVN off_RP ._. 
Well_RR I_PPIS1 do_VD0 n't_XX know_VVI ._. 
It_PPH1 's_VBZ all_DB that_CST work_VV0 you_PPY do_VD0 ,_, cut_VV0 the_AT lawn_NN1 ._. 
And_CC ._. 
Right_RR that_DD1 's_VBZ all_DB ._. 
That_DD1 one_MC1 is._NNU here_RL we_PPIS2 go_VV0 ._. 
It_NN1 's_VBZ ._. 
I_PPIS1 'm_VBM ._. 
No_UH ,_, I_PPIS1 do_VD0 n't_XX ._. 
It_PPH1 'll_VM ._. 
They_PPHS2 're_VBR horrible_JJ things._NNU hill_NN1 only_RR in_II first_MD gear_NN1 ._. 
I_PPIS1 think_VV0 it_PPH1 's_VBZ hard_RR work_VV0 in_II n_ZZ1 it_PPH1 ?_? 
Going_VVG ,_, more_DAR power_NN1 ,_, need_VV0 a_AT1 push_NN1 behind_RL ,_, get_VV0 up_RP that_DD1 bloody_JJ hill_NN1 ._. 
Change_VV0 gears._NNU ,_, pay_VV0 four_MC ,_, five_MC ,_, two_MC hundred_NNO quid_NN I_PPIS1 think_VV0 ,_, cor_UH bloody_JJ hell_NN1 ._. 
Grass_NN1 ._. 
That_DD1 's_VBZ what_DDQ we_PPIS2 were_VBDR saying_VVG ,_, well_RR why_RRQ does_VDZ everybody_PN1 buy_VVI to_II then_RT ?_? 
Exactly_RR ,_, latest_JJT craze_NN1 ._. 
Course_VV0 it_PPH1 is_VBZ ,_, how_RRQ do_VD0 you_PPY buy_VVI ,_, why_RRQ do_VD0 you_PPY buy_VVI a_AT1 bike_NN1 with_IW no_AT mudguards_NN2 for_IF ?_? 
Said_VVD to_II Bert_NP1 that_CST got_VVD to_TO be_VBI a_AT1 right_JJ dopey_NN1 dick_NN1 to_TO ride_VVI a_AT1 bike_NN1 with_IW no_AT mudguards_NN2 on_RP ._. 
Would_VM n't_XX say_VVI he_PPHS1 had_VHD to_TO buy_VVI a_AT1 pair_NN ,_, track_NN1 bike_NN1 ,_, he_PPHS1 's_VBZ make_VV0 their_APPGE own_DA up_VV0 ._. 
He_PPHS1 said_VVD I_MC1 on_II the_AT back_NN1 at_RR21 least_RR22 ._. 
Mm_UH ._. 
Still_RR there_RL you_PPY are_VBR ,_, glad_JJ somebody_PN1 making_VVG some_DD profit_NN1 ,_, just_RR shows_VVZ what_DDQ we_PPIS2 do_VD0 buy_VVI ,_, do_VD0 n't_XX we_PPIS2 ?_? 
I_PPIS1 tell_VV0 you_PPY I_PPIS1 could_VM n't_XX get_VVI going_VVG at_RR21 all_RR22 not_XX ._. 
I_PPIS1 could_VM beat_VVI you_PPY ._. 
He_PPHS1 could_VM ._. 
Andy_NP1 ._. 
I_PPIS1 thought_VVD ,_, I_PPIS1 thought_VVD there_EX were_VBDR gon_NN1 na_FW be_VBI a_AT1 good_JJ ride_NN1 ,_, but_CCB ._. 
Like_II Andrew_NP1 's_GE ._. 
He_PPHS1 probably_RR got_VVD the_AT rough_JJ one_PN1 ._. 
Like_II Andrew_NP1 ._. 
Yeah_UH ,_, that_DD1 was_VBDZ ,_, that_DD1 was_VBDZ similar_JJ sort_NN1 of_IO ride_NN1 hard_RR bloody_JJ work_NN1 ._. 
Yeah_UH ._. 
All_RR21 right_RR22 up_RP round_II here_RL ideal_JJ ,_, up_RP and_CC down_RP the_AT bumps_NN2 over_II the_AT guard_NN1 ,_, but_CCB when_CS you_PPY get_VV0 it_PPH1 out_RP on_II the_AT road_NN1 ,_, very_RG hard_JJ work_NN1 ,_, similar_JJ sort_NN1 of_IO ride_NN1 ,_, well_RR I_PPIS1 suppose_VV0 it_PPH1 will_VM be_VBI ,_, run_VVN around_II the_AT you_PPY 've_VH0 got_VVN ta_UH push_VV0 around_RP Alright_RR if_CS you_PPY 're_VBR double_JJ fit_JJ I_PPIS1 suppose_VV0 ,_, and_CC you_PPY 've_VH0 got_VVN a_RR21 bit_RR22 more_RRR help_VV0 to_TO around_RP ._. 
Yes_UH ._. 
I_PPIS1 only_RR took_VVD three_MC quarters_NN2 of_IO an_AT1 hour_NNT1 to_TO get_VVI there_RL ._. 
It_PPH1 took_VVD about_RP just_RR over_RG half_DB an_AT1 hour_NNT1 to_TO get_VVI back_RP ._. 
How_RRQ 's_VBZ that_DD1 for_IF straight_RR down_II Lane_NN1 ,_, straight_RR over_II lights_NN2 up_II hill_NN1 ,_, along_II the_AT top_NN1 here_RL ._. 
Well_RR it_PPH1 's_VBZ still_RR not_XX bad_JJ at._NNU cold_JJ last_MD night_NNT1 ,_, ,_, far_RR old_JJ long_JJ trot_NN1 down_II from_II hill_NN1 ,_, in_II n_ZZ1 it_PPH1 ?_? 
The_AT Bells_NN2 ,_, it_PPH1 's_VBZ all_DB down_II hill_NN1 until_CS you_PPY hit_VV0 all_DB down_II hill_NN1 ._. 
Yeah._NP1 nice_JJ and_CC ,_, nice_JJ ,_, but_CCB even_RR then_RT they_PPHS2 could_VM n't_XX really_RR ._. 
Well_RR I_PPIS1 want_VV0 something_PN1 in_RL21 between_RL22 ,_, like_II the_AT old_JJ sports_NN2 ,_, straight_RR down_RP the_AT bike_NN1 job_NN1 ._. 
Well_RR is_VBZ he_PPHS1 gon_NN1 na_FU ride_NN1 on_II one_MC1 man_NN1 's_GE ?_? 
Mind_VV0 probably_RR more_RGR comfortable_JJ than_CSN the_AT base_NN1 were_VBDR n't_XX they_PPHS2 ?_? 
I_PPIS1 got_VVD used_JJ to_II them_PPHO2 ._. 
I_PPIS1 ,_, yeah_UH ,_, I_PPIS1 drove_VVD up_RP ,_, up_RP there_RL and_CC back_NN1 ,_, like_RR ,_, my_APPGE leg_NN1 do_VD0 n't_XX ache_VVI ,_, they_PPHS2 ached_VVD a_RR21 bit_RR22 at_II a_AT1 time_NNT1 ,_, but_CCB that_DD1 ,_, you_PPY know_VV0 that_DD1 bone_NN1 you_PPY get_VV0 ,_, each_DD1 side_NN1 of_IO your_APPGE keep_VV0 your_APPGE thumb_NN1 there_RL ,_, you_PPY 've_VH0 got_VVN that_DD1 bone_NN1 ,_, underneath_RL there_EX 's_VBZ a_AT1 bone_NN1 there_RL ,_, you_PPY might_VM ,_, or_CC the_AT bottom_JJ bone_NN1 that_CST you_PPY 'll_VM sit_VVI on_RP ,_, you_PPY know_VV0 when_RRQ you_PPY sit_VV0 still_JJ you_PPY get_VV0 that_DD1 bone_NN1 ._. 
Tail_NN1 bone_NN1 ._. 
No_UH ,_, the_AT bottom_NN1 here_RL ,_, you_PPY 've_VH0 got_VVN two_MC ,_, you_PPY 've_VH0 got_VVN two_MC ,_, just_RR in_II there_RL ,_, in_II there_RL you_PPY got_VVD the_AT bones_NN2 ._. 
Pelvis_NN1 ._. 
Might_VM be_VBI the_AT bottom_NN1 of_IO your_APPGE pelvis_NN1 ,_, in_II there_RL ._. 
Yeah_UH ._. 
Bloody_RR hurt_VV0 it_PPH1 bruises_VVZ ,_, you_PPY sit_VV0 on_II it_PPH1 and_CC it_PPH1 does_VDZ n't_XX ,_, I_PPIS1 thought_VVD I_PPIS1 might_VM ,_, I_PPIS1 suppose_VV0 after_II a_AT1 while_NNT1 you_PPY 'll_VM get_VVI blisters_NN2 but_CCB it_PPH1 's_VBZ bruised_VVN ,_, when_CS you_PPY sit_VV0 on_II the_AT bloody_JJ thing_NN1 ._. 
And_CC they_PPHS2 sit_VV0 To_TO get_VVI a_AT1 softer_JJR saddle_NN1 you_PPY might_VM get_VVI other_JJ problems_NN2 ._. 
You_PPY might_VM get_VVI other_JJ problems_NN2 ._. 
You_PPY get_VV0 sore_JJ bones_NN2 sitting_VVG down_RP on_II anything_PN1 ._. 
Oh_UH can_VM do_VDI ,_, yeah_UH ,_, yeah_UH ,_, yeah_UH ._. 
Especially_RR for_IF me_PPIO1 ._. 
Yeah_UH ,_, oh_UH crikey_UH ,_, yeah_UH ._. 
They_PPHS2 all_DB ride_VV0 back_RP ._. 
I_PPIS1 thought_VVD we_PPIS2 're_VBR gon_NN1 na_FU so_RR we_PPIS2 came_VVD out_II21 of_II22 Paul_NP1 's_GE place_NN1 ,_, behind_II Belmont_NP1 Parade_NN1 ,_, up_RP past_II the_AT ponds_NN2 there_RL and_CC that_DD1 's_VBZ and_CC I_PPIS1 'm_VBM knackered_JJ ,_, I_PPIS1 'm_VBM going_VVG up_II river_NN1 ,_, had_VHD no_RR you_PPY start_VV0 at_II the_AT bottom_NN1 of_IO Belmont_NP1 Parade_NN1 ,_, up_II those_DD2 ponds_NN2 up_II21 to_II22 the_AT traffic_NN1 lights_NN2 where_CS you_PPY change_VV0 buses_NN2 ,_, that_DD1 's_VBZ all_DB up_II hill_NN1 and_CC it_PPH1 's_VBZ slow_JJ ,_, and_CC you_PPY 've_VH0 just_RR started_VVN and_CC you_PPY 're_VBR not_XX warm_JJ and_CC it_PPH1 's_VBZ like_II running_VVG out_II21 of_II22 here_RL ,_, running_VVG up_II that_DD1 hill_NN1 there_RL ,_, now_RT you_PPY could_VM run_VVI up_II that_DD1 hill_NN1 if_CS you_PPY got_VVD ,_, if_CS you_PPY had_VHD sort_RR21 of_RR22 round_II a_AT1 couple_NN1 of_IO times_NNT2 round_II nice_JJ ,_, no_PN121 one_PN122 so_RG more_RGR ready_JJ to_TO go_VVI ,_, you_PPY 'd_VM run_VVI up_RP there_RL ,_, you_PPY come_VV0 out_II21 of_II22 here_RL ,_, run_VV0 down_RP here_RL ,_, not_XX warm_JJ ,_, feel_VV0 you_PPY get_VVI ,_, well_RR I_PPIS1 come_VV0 out_II21 of_II22 there_RL and_CC ,_, and_CC you_PPY get_VV0 ,_, you_PPY go_VV0 up_RP past_II that_DD1 set_NN1 of_IO traffic_NN1 lights_NN2 ,_, you_PPY go_VV0 up_RP and_CC you_PPY 're_VBR still_RR struggling_VVG past_II The_AT Bull_NP1 ,_, that_DD1 's_VBZ still_RR up_II hill_NN1 ,_, you_PPY get_VV0 to_II the_AT ,_, just_RR round_II that_DD1 bend_NN1 and_CC it_PPH1 starts_VVZ dropping_VVG down_RP ,_, and_CC it_PPH1 's_VBZ a_AT1 gradual_JJ drop_NN1 down_RP ,_, below_II the_AT roundabout_NN1 and_CC the_AT next_MD roundabout_NN1 's_VBZ pretty_RG level_JJ there_RL ,_, not_XX too_RG bad_JJ a_AT1 roundabout_NN1 ,_, right_RR the_AT way_NN1 across_RL to_II Scades_NP1 Hill_NNL1 ,_, went_VVD down_II Scades_NP2 Hill_NN1 ,_, right_RR the_AT way_NN1 down_RP to_II Alton_NP1 ,_, bottom_NN1 of_IO Alton_NP1 high_JJ street_NN1 ,_, came_VVD out_RP by_II the_AT toilets_NN2 at_II White_NP1 Hart_NP1 to_II High_NP1 Street_NNL1 ,_, up_RP to_TO house_VVI ._. 
Mhm_UH ._. 
That_DD1 's_VBZ a_AT1 bit_NN1 of_IO a_AT1 drag_VV0 ._. 
Yeah_UH ._. 
That_DD1 's_VBZ a_AT1 bit_NN1 of_IO a_AT1 long_RR drag_VV0 that_DD1 one_PN1 ,_, not_XX that_CST Paul_NP1 take_VV0 open_VV0 up_RP a_RR21 bit_RR22 there_RL and_CC go_VV0 a_RR21 bit_RR22 faster_RRR ,_, level_NN1 ,_, but_CCB that_DD1 was_VBDZ a_RR21 bit_RR22 Well_RR 's_VHZ done_VDN a_AT1 left_JJ up_II21 to_II22 Chell_NP1 's_GE Field_NN1 and_CC that_DD1 ,_, bloody_RR that_CST killed_VVD him_PPHO1 ,_, I_PPIS1 bet_VV0 ,_, you_PPY know_VV0 the_AT bit_NN1 I_PPIS1 mean_VV0 ,_, and_CC up_RP over_II the_AT fields_NN2 ,_, where_CS you_PPY go_VV0 through_II the_AT fields_NN2 and_CC fields_NN2 ,_, that_DD1 was_VBDZ the_AT killer_NN1 ,_, cos_CS and_CC coming_VVG back_RP Bell_NP1 's_VBZ straight_RR round_RP to_II ,_, got_VVN to_II the_AT bottom_NN1 ,_, Hill_NP1 was_VBDZ n't_XX too_RG bad_JJ ._. 
It_PPH1 's_VBZ a_AT1 short_JJ ,_, sharp_JJ ,_, you_PPY can_VM see_VVI it_PPH1 there_RL ,_, you_PPY get_VV0 to_II the_AT top_NN1 of_IO it_PPH1 ,_, get_VV0 up_II21 to_II22 your_APPGE roundabout_NN1 ,_, we_PPIS2 hang_VV0 a_AT1 right_NN1 ,_, and_CC the_AT next_MD ,_, it_PPH1 's_VBZ a_AT1 bit_NN1 of_IO a_AT1 drag_VV0 all_DB the_AT way_NN1 up_RP ,_, you_PPY save_VV0 coming_VVG ,_, coming_VVG the_AT other_JJ way_NN1 it_PPH1 's_VBZ down_II hill_NN1 ,_, from_II just_RR past_II The_AT Bull_NP1 ,_, until_CS you_PPY get_VV0 to_II the_AT ,_, almost_RR to_II that_DD1 junction_NN1 you_PPY turn_VV0 off_RP the_AT top_NN1 and_CC you_PPY 're_VBR going_VVG up_II hill_NN1 ,_, just_RR slowly_RR ,_, but_CCB cor_UH ,_, you_PPY get_VV0 up_II21 to_II22 that_DD1 ,_, our_APPGE junction_NN1 ,_, she_PPHS1 drops_VVZ down_RP ,_, we_PPIS2 went_VVD straight_RR down_RP through_II the_AT High_JJ Street_NN1 ,_, and_CC we_PPIS2 hung_VVD a_AT1 right_NN1 in_II the_AT one_MC1 way_NN1 system_NN1 ,_, turn_VV0 left_RL ,_, did_VDD n't_XX get_VVI ,_, quite_RR get_VV0 to_II Green_NP1 Lane_NNL1 ,_, turn_VV0 left_RL and_CC up_RP we_PPIS2 come_VV0 round_RP the_AT Green_NP1 Lane_NNL1 ,_, up_RP and_CC in_II the_AT back_NN1 way_NN1 ._. 
Mm_UH ._. 
I_PPIS1 say_VV0 ,_, it_PPH1 took_VVD us_PPIO2 three_MC quarters_NN2 of_IO an_AT1 hour_NNT1 to_TO get_VVI there_RL ,_, three_MC quarters_NN2 of_IO an_AT1 hour_NNT1 to_TO get_VVI there_RL ,_, just_RR over_II the_AT half_DB an_AT1 hour_NNT1 getting_VVG back_RP ._. 
Mind_VV0 you_PPY got_VVD short_RR that_DD1 was_VBDZ a_AT1 killer_NN1 up_RP round_RP by_II place_NN1 ._. 
I_PPIS1 reckon_VV0 we_PPIS2 got_VVD down_RP from_II The_AT Bells_NN2 ,_, Chell_NP1 's_GE Field_NN1 ,_, to_II the_AT bottom_NN1 of_IO ,_, six_MC ,_, seven_MC minutes_NNT2 ._. 
Might_VM be_VBI a_RR21 bit_RR22 more_DAR than_CSN that_DD1 ,_, but_CCB erm_FU ,_, could_VM of_IO been_VBN nine_MC ._. 
She_PPHS1 said_VVD would_VM n't_XX get_VVI up_II hill_NN1 How_RRQ these_DD2 blokes_NN2 go_VV0 I_PPIS1 do_VD0 n't_XX know_VVI ,_, are_VBR n't_XX they_PPHS2 ?_? 
Mm_UH Mind_VV0 you_PPY ,_, it_PPH1 's_VBZ the_AT bloke_NN1 in_II the_AT front_JJ keeps_NN2 do_VD0 n't_XX he_PPHS1 ?_? 
Keep_VV0 tucked_VVN in_RP behind_II the_AT side_NN1 always_RR said_VVD to_II you_PPY ,_, the_AT bloke_NN1 in_II the_AT front_NN1 ,_, mate_NN1 ,_, he_PPHS1 does_VDZ all_RR the_AT donkey_NN1 work_NN1 ,_, picking_VVG up_RP drags_VVZ you_PPY round_JJ do_VD0 n't_XX it_PPH1 ?_? 
Whether_CSW he_PPHS1 punches_VVZ hole_NN1 in_II the_AT wind_NN1 ,_, in_II the_AT air_NN1 or_CC not_XX I_MC1 du_FW n_ZZ1 no_UH ,_, like_II cards_NN2 ._. 
Yeah_UH ._. 
He_PPHS1 does_VDZ seem_VVI eager_JJ ,_, up_RP behind_II some_DD ,_, long_RR as_CSA you_PPY get_VV0 a_AT1 right_JJ distance_NN1 ,_, too_RG far_JJ and_CC you_PPY get_VV0 oh_UH ,_, they_PPHS2 're_VBR fighting_VVG it_PPH1 again_RT ,_, whereas_CS you_PPY can_VM get_VVI right_RR up_RP ._. 
We_PPIS2 were_VBDR thinking_VVG of_IO the_AT car_NN1 ,_, a_AT1 slower_JJR car_NN1 ,_, could_VM overtake_VVI a_AT1 by_II getting_VVG up_RP behind_II you_PPY ,_, and_CC when_CS you_PPY coming_VVG out_RP ,_, as_CS31 soon_CS32 as_CS33 he_PPHS1 comes_VVZ out_RP Yeah._NP1 he_PPHS1 's_VHZ got_VVN to_TO go_VVI back_RP again_RT ._. 
That_DD1 's_VBZ what_DDQ I_PPIS1 thought_VVD ._. 
But_CCB they_PPHS2 do_VD0 n't_XX ,_, do_VD0 they_PPHS2 ?_? 
You_PPY get_VV0 ,_, or_CC you_PPY get_VV0 two_MC cars_NN2 of_IO equal_JJ speed_NN1 ,_, along_RP straight_RR Well_RR it_PPH1 's_VBZ a_AT1 memento_NN1 in_II n_ZZ1 it_PPH1 ?_? one_PN1 get_VV0 ,_, yeah_UH ,_, one_PN1 gets_VVZ up_RP behind_II it_PPH1 and_CC can_VM in_II the_AT back_NN1 I_PPIS1 suppose_VV0 ,_, but_CCB they_PPHS2 go_VV0 after_CS they_PPHS2 ,_, and_CC then_RT ,_, you_PPY think_VV0 as_CS31 soon_CS32 as_CS33 you_PPY pull_VV0 out_RP ,_, you_PPY 're_VBR gon_NN1 na_FW get_VV0 all_DB that_DD1 ,_, yeah_UH ,_, he_PPHS1 's_VBZ gon_NN1 na_FW get_VV0 all_DB that_DD1 ,_, but_CCB they_PPHS2 do_VD0 n't_XX do_VDI they_PPHS2 ?_? 
They_PPHS2 do_VD0 n't_XX ._. 
Got_VVD ta_UH be_VBI a_AT1 reason_NN1 for_IF that_DD1 I_PPIS1 suppose_VV0 ._. 
Cos_CS they_PPHS2 're_VBR going_VVG flat_NN1 out_RP when_CS they_PPHS2 're_VBR like_II that_DD1 ,_, it_PPH1 's_VBZ not_XX like_II you_PPY gon_NN1 na_FW say_VV0 like_JJ ,_, when_CS you_PPY go_VV0 on_II a_AT1 ,_, like_RR overtake_VV0 mode_NN1 ,_, when_CS you_PPY 're_VBR like_II that_DD1 ,_, they_PPHS2 are_VBR flat_RR out_RP down_II the_AT straight_JJ ,_, all_DB you_PPY go_VV0 to_TO get_VVI a_AT1 out_RP ._. 
Mm_UH ._. 
It_PPH1 's_VBZ not_XX like_CS He_PPHS1 goes_VVZ Yes_UH ,_, it_PPH1 's_VBZ not_XX like_CS he_PPHS1 's_VBZ going_VVG ,_, he_PPHS1 's_VBZ ,_, he_PPHS1 's_VBZ going_VVG faster_JJR than_CSN this_DD1 geezer_NN1 ,_, he_PPHS1 's_VBZ not_XX ,_, he_PPHS1 's_VBZ getting_VVG a_AT1 drag_VV0 from_II him_PPHO1 ,_, then_RT all_RR41 of_RR42 a_RR43 sudden_RR44 he_PPHS1 comes_VVZ out_RP and_CC he_PPHS1 goes_VVZ faster_JJR you_PPY think_VV0 ,_, explain_VV0 a_RR31 little_RR32 bit_RR33 more_DAR on_II the_AT old_JJ ._. 
I_PPIS1 really_RR do_VD0 n't_XX know._NNU same_DA lines_NN2 ,_, but_CCB ,_, he_PPHS1 know_VV0 he_PPHS1 ,_, you_PPY assume_VV0 that_CST as_CS31 soon_CS32 as_CS33 you_PPY got_VVD outside_II him_PPHO1 ,_, that_DD1 bloody_JJ draft_NN1 would_VM come_VVI round_RP and_CC push_VVI him_PPHO1 back_RP and_CC the_AT other_JJ bloke_NN1 would_VM carry_VVI on_RP ._. 
Yeah_UH ._. 
We_PPIS2 might_VM have_VHI a_AT1 bit_NN1 of_IO a_AT1 winner_NN1 tonight_RT ._. 
Mm_UH ,_, pretty_RG quick_JJ are_VBR n't_XX they_PPHS2 ?_? 
They_PPHS2 're_VBR first_MD and_CC second_NNT1 ._. 
Yep._NP1 tend_VV0 to_TO blow_VVI up_RP do_VD0 they_PPHS2 ?_? 
Mansell_NP1 tends_VVZ to_TO break_VVI him_PPHO1 do_VD0 n't_XX he_PPHS1 ?_? 
Yep_UH ._. 
The_AT other_JJ bloke_NN1 tends_VVZ to_TO run_VVI out_II21 of_II22 road_NN1 a_RR21 bit_RR22 do_VD0 n't_XX he_PPHS1 ?_? 
Aye_UH we_PPIS2 Bit_VVD erratic_JJ in_II n_ZZ1 it_PPH1 ?_? 
Yeah_UH ,_, he_PPHS1 's_VBZ not_XX a_AT1 real_JJ charger_NN1 is_VBZ he_PPHS1 ?_? 
No_UH ._. 
The_AT only_JJ thing_NN1 that_CST I_PPIS1 will_VM do_VDI ,_, that_CST he_PPHS1 might_VM do_VDI ,_, he_PPHS1 might_VM keep_VVI ,_, cos_CS once_RR gets_VVZ away_RL mate_VV0 that_DD1 's_VBZ he_PPHS1 might_VM keep_VVI him_PPHO1 behind_RL ._. 
Mm_UH ._. 
Yeah_UH ,_, not_XX used_VVN to_II driving_VVG behind_RL is_VBZ he_PPHS1 ?_? 
No_UH ._. 
He_PPHS1 's_VHZ always_RR had_VHN to_TO keep_VVI that_DD1 bloody_JJ thing_NN1 ._. 
Yeah_UH ._. 
Ferrari_NP1 or_CC something_PN1 ._. 
Yeah_UH ._. 
How_RRQ comes_VVZ you_PPY only_RR stayed_VVN at_II the_AT Curry_NN1 House_NN1 ?_? 
Ha_UH ,_, ha_UH ,_, no_UH I_PPIS1 never_RR ._. 
Ha_UH ?_? 
No_UH I_PPIS1 'm_VBM actually_RR ._. 
Fucking_JJ hell_NN1 ._. 
Did_VDD you_PPY have_VHI money_NN1 ?_? 
About_RG a_AT1 fiver._NNU money_NN1 ,_, so_CS I_PPIS1 ponce_VV0 off_II him_PPHO1 ,_, you_PPY know_VV0 ,_, was_VBDZ well_RR got_VVN a_AT1 free_JJ curry_NN1 a_AT1 free_JJ beer_NN1 ._. 
I_PPIS1 must_VM say_VVI ,_, is_VBZ the_AT heavy_JJ way_NN1 ._. 
Yeah_UH where_RRQ were_VBDR we_PPIS2 doing_VDG that_DD1 ?_? 
Way_NN1 down_RP to_II a_AT1 ._. 
Yes_UH ,_, well_RR that_DD1 ._. 
Where_RRQ do_VD0 you_PPY lot_NN1 got_VVN with_IW last_MD night_NNT1 ,_, pissed_VVD off_RP .._... 
It_PPH1 's_VBZ not_XX ,_, it_PPH1 's_VBZ people_NN do_VD0 n't_XX understand_VVI or_CC something_PN1 .._... 
Y_ZZ1 M_ZZ1 C_ZZ1 A_ZZ1 whatever_DDQV ._. 
Y_ZZ1 M_ZZ1 C_ZZ1 A._NP1 Makes_VVZ me_PPIO1 Oh_UH fucking_RR hell._NNU goes_VVZ erm_FU ,_, oh_UH sort_RR21 of_RR22 ._. 
Best_JJT part_NN1 of_IO breaking_VVG up_RP ,_, you_PPY making_VVG up_RP ,_, best_JJT part_NN1 of_IO breaking_VVG up_RP Breaking_VVG up_RP ,_, you_PPY ,_, best_JJT part_NN1 of_IO breaking_VVG up_RP Breaking_VVG up_RP ,_, you_PPY ,_, news_NN1 on_II waking_VVG up_RP And_CC you_PPY used_VVD to_II funky_JJ little_JJ reggae_NN1 ,_, oh_UH my_APPGE god_NN1 singing_VVG ._. 
Singing_VVG Singing_VVG They_PPHS2 all_DB ,_, even_RR all_DB the_AT girls_NN2 that_CST were_VBDR screaming_VVG like_II yeah_UH Yeah_UH ._. 
Yeah_UH ._. 
Getting_VVG ._. 
They_PPHS2 're_VBR bloody_RR ._. 
Right_RR ,_, anybody_PN1 else_RR ?_? 
There_EX should_VM be_VBI a_AT1 timetable_NN1 at_II sometime_RT ._. 
Yeah_UH there_EX is_VBZ ._. 
Eh_UH do_VD0 ._. 
Already_RR ,_, Thursday_NPD1 ._. 
It_PPH1 's_VBZ what_DDQ this_DD1 Thursday_NPD1 ?_? 
Next_MD Thursday_NPD1 ._. 
Alright_RR ._. 
If_CS it_PPH1 's_VBZ ,_, if_CS it_PPH1 's_VBZ the_AT first_MD Thursday_NPD1 ._. 
Eh_UH ,_, right_RR if_CS you_PPY 've_VH0 got_VVN one_MC1 of_IO the_AT the_AT two_MC plus_II three_MC ,_, have_VH0 we_PPIS2 ,_, have_VH0 we_PPIS2 all_DB got_VVN these_DD2 ,_, yeah_UH ?_? 
Yeah_UH ,_, have_VH0 we_PPIS2 got_VVN these_DD2 ?_? 
These_DD2 complex_JJ questions_NN2 ._. 
The_AT one_PN1 where_RRQ that_DD1 one_MC1 number_NN1 eight_MC and_CC it_PPH1 's_VBZ ,_, it_PPH1 's_VHZ got_VVN that_DD1 complex_JJ number_NN1 ,_, that_DD1 's_VBZ the_AT one_PN1 we_PPIS2 looked_VVD at_II just_RR before_II the_AT end_NN1 of_IO half_DB term_NN1 ,_, yeah_UH ._. 
Where_CS you_PPY got_VVD number_NN1 ,_, so_RR what_DDQ you_PPY do_VD0 is_VBZ you_PPY multiply_VV0 by_II the_AT complex_JJ conjugate_NN1 ,_, top_JJ and_CC bottom_NN1 ,_, if_CS we_PPIS2 do_VD0 that_DD1 ,_, it_PPH1 comes_VVZ out_RP ,_, out_II21 of_II22 multiple_NN1 of_IO one_PN1 ._. 
I_PPIS1 think_VV0 it_PPH1 's_VBZ a_AT1 is_VBZ it_PPH1 ?_? 
Yeah_UH it_PPH1 is_VBZ ._. 
Oh_UH ._. 
Oh_UH it_PPH1 is_VBZ ._. 
Yeah_UH ,_, half_DB ._. 
It_PPH1 's_VBZ a_AT1 half_NN1 ,_, now_RT if_CS it_PPH1 's_VBZ a_AT1 half_NN1 of_IO that_DD1 ._. 
And_CC then_RT the_AT second_MD says_VVZ show_NN1 that_CST that_DD1 complex_NN1 numbered_VVN to_II the_AT power_NN1 of_IO four_MC where_RRQ that_DD1 complex_JJ number_NN1 is_VBZ that_DD1 complex_JJ number_NN1 ,_, so_RR all_DB you_PPY do_VD0 is_VBZ that_CST four_MC ,_, that_DD1 and_CC then_RT you_PPY get_VV0 minus_II a_AT1 corner_NN1 ._. 
Yes_UH ,_, so_RR that_DD1 's_VBZ the_AT answers_NN2 ._. 
So_RR the_AT two_MC answers_NN2 are_VBR land_NN1 and_CC the_AT answer_NN1 is_VBZ minus_II a_AT1 quarter_NN1 ,_, I_PPIS1 'll_VM pin_VVI that_CST one_PN1 on_II the_AT board_NN1 ._. 
Right_RR ,_, the_AT second_MD one_PN1 now_RT I_PPIS1 'm_VBM gon_NN1 na_FW do_VD0 ,_, is_VBZ the_AT one_PN1 that_CST 's_VBZ equals_NN2 three_MC plus_II four_MC ,_, yeah_UH ,_, and_CC you_PPY have_VH0 got_VVN ta_UH write_VV0 down_RP in_II the_AT form_NN1 P_ZZ1 plus_II Q_ZZ1 I_ZZ1 so_CS it_PPH1 's_VBZ the_AT real_JJ bit_NN1 plus_II the_AT imaginary_JJ bit_NN1 ,_, one_PN1 over_II Z._NP1 One_MC1 over_II Z_ZZ1 is_VBZ one_MC1 over_RG three_MC plus_II four_MC I_ZZ221 's_ZZ222 ,_, I_PPIS1 think_VV0 we_PPIS2 'll_VM do_VDI that_DD1 ._. 
How_RRQ do_VD0 we_PPIS2 go_VVI to_II the_AT the_AT form_NN1 ,_, a_AT1 number_NN1 plus_II times_NNT2 it_PPH1 by_II the_AT convex_JJ conjugate_NN1 ,_, is_VBZ sub_JJ three_MC minus_II four_MC I_ZZ1 ,_, three_MC minus_II four_MC I_ZZ1 ,_, and_CC what_DDQ we_PPIS2 get_VV0 is_VBZ three_MC minus_II four_MC I_ZZ1 ,_, over_RG twenty_MC five_MC ,_, eh_UH ,_, that_DD1 sound_NN1 reasonable_JJ to_II three_MC twenty_MC fifths_MF ,_, minus_II four_MC twenty_MC fifths_MF high_JJ and_CC that_DD1 's_VBZ Q_ZZ1 ,_, I_PPIS1 ,_, and_CC one_PN1 over_II Z_ZZ1 square_JJ or_CC the_AT second_MD bit_NN1 ,_, several_DA2 ways_NN2 to_TO do_VDI this_DD1 ,_, what_DDQ you_PPY can_VM do_VDI is_VBZ work_NN1 out_RP what_DDQ the_AT square_NN1 is_VBZ first_MD ,_, so_RR if_CS I_PPIS1 do_VD0 a_RR21 little_RR22 aside_RL Z_ZZ1 square_JJ ,_, it_PPH1 's_VBZ three_MC plus_II four_MC I_PPIS1 square_VV0 ,_, which_DDQ is_VBZ nine_MC plus_II three_MC forty_MC five_MC ,_, twenty_MC four_MC I_ZZ1 ,_, plus_II sixteen_MC I_PPIS1 square_VV0 ,_, which_DDQ is_VBZ twenty_MC four_MC I_ZZ1 ,_, divide_VV0 seven_MC ,_, who_PNQS 's_VBZ that_DD1 ,_, so_CS one_PN1 over_II Z_ZZ1 square_NN1 is_VBZ one_MC1 over_RP ,_, minus_II seven_MC plus_II twenty_MC four_MC I._NP1 Multiply_VV0 by_II the_AT complex_NN1 you_PPY get_VV0 again_RT ,_, and_CC work_VV0 the_AT Z_ZZ1 square_JJ that_CST 's_VBZ pretty_RG hard_JJ to_TO multiply_VVI M_ZZ1 ,_, I_PPIS1 ,_, square_NN1 minus_II one_MC1 ,_, do_VD0 that_DD1 by_II changing_VVG the_AT imaginary_JJ ,_, and_CC multiply_VV0 by_RP ,_, then_RT you_PPY get_VV0 an_AT1 answer_NN1 ._. 
You_PPY could_VM square_VVI that_DD1 ,_, you_PPY could_VM square_VVI that_DD1 complex_JJ number_NN1 ,_, right_RR ,_, if_CS that_DD1 's_VBZ ,_, because_CS one_PN1 over_II Z_ZZ1 is_VBZ square_JJ one_PN1 over_II Z_ZZ1 ,_, one_PN1 over_II squared_JJ ,_, Yeah_UH ,_, problems_NN2 ,_, cos._NNU once_CS you_PPY 've_VH0 got_VVN one_PN1 over_II Z_ZZ1 squared_VVN ,_, if_CS I_PPIS1 work_VV0 it_PPH1 out_RP ,_, you_PPY get_VV0 minus_II seven_MC ,_, minus_II twenty_MC four_MC I_MC1 over_RP ,_, ten_MC sevens_MC2 erm_FU oh_UH ,_, so_CS you_PPY get_VV0 forty_MC nine_MC on_II the_AT bottom_NN1 is_VBZ that_DD1 ?_? 
No_UH ,_, no_UH ,_, not_XX forty_MC nine_MC ._. 
That_DD1 's_VBZ not_XX forty_MC nine_MC ,_, it_PPH1 's_VBZ erm_FU ,_, that_DD1 's_VBZ twenty_MC four_MC ,_, which_DDQ is_VBZ seven_MC ,_, twenty_MC four_MC ,_, twenty_MC five_MC ,_, twenty_MC six_MC ,_, six_MC hundred_NNO and_CC twenty_MC five_MC ._. 
What_DDQ 's_VBZ that_DD1 ?_? 
So_RR we_PPIS2 get_VV0 minus_II seven_MC of_IO six_MC ,_, two_MC ,_, five_MC ,_, minus_II twenty_MC four_MC I_ZZ1 ,_, over_RG six_MC ,_, two_MC ,_, five_MC ._. 
Right_RR that_DD1 's_VBZ the_AT ,_, the_AT complex_JJ number_NN1 one_MC1 over_II Z_ZZ1 square_JJ ,_, that_DD1 's_VBZ the_AT answer_NN1 ._. 
Right_RR ,_, you_PPY 're_VBR ,_, you_PPY 're_VBR happy_JJ about_II how_RRQ I_PPIS1 got_VVD that_DD1 ?_? 
Yes_UH ._. 
Yes_UH ._. 
Yes._NP1 a_RR21 bit_RR22 louder_JJR ,_, ,_, a_AT1 just_RR ,_, seven_MC square_JJ ,_, minus_II seven_MC ,_, minus_II seven_MC ,_, gives_VVZ me_PPIO1 plus_II forty_MC nine_MC yeah_UH ?_? 
Yeah_UH ._. 
The_AT minus_NN1 ,_, seven_MC times_NNT2 that_CST ,_, we_PPIS2 could_VM be_VBI plus_II something_PN1 ,_, and_CC an_AT1 seven_MC times_NNT2 that_CST one_MC1 would_VM give_VVI you_PPY minus_II pass_NN1 onto_II that_DD1 ,_, then_RT twenty_MC four_MC times_NNT2 twenty_MC four_MC is_VBZ five_MC hundred_NNO and_CC seventy_MC six_MC ,_, I_PPIS1 square_VV0 ,_, for_IF it_PPH1 's_VBZ minus_RR I_PPIS1 square_VV0 ,_, minus_II formula_NN1 cos_CS then_RT when_CS I_PPIS1 add_VV0 to_TO add_VVI I_PPIS1 get_VV0 six_MC hundred_NNO and_CC twenty_MC five_MC ,_, it_PPH1 's_VBZ just_JJ ,_, it_PPH1 's_VBZ one_PN1 ,_, you_PPY know_VV0 like_II the_AT three_MC ,_, four_MC ,_, five_MC ,_, triangle_NN1 ,_, in_II Pythagoras_NP2 ,_, yeah_UH ,_, you_PPY know_VV0 ,_, when_CS you_PPY get_VV0 three_MC ,_, four_MC ,_, five_MC ,_, and_CC you_PPY can_VM make_VVI them_PPHO2 three_MC squared_VVN ,_, four_MC squared_VVN ,_, so_RR is_VBZ five_MC squared_VVN ,_, right_RR ,_, well_RR ,_, seven_MC ,_, twenty_MC four_MC ,_, twenty_MC five_MC ,_, is_VBZ another_DD1 one_MC1 of_IO those_DD2 ,_, right_RR that_DD1 's_VBZ how_RRQ I_PPIS1 knew_VVD seven_MC ,_, twenty_MC four_MC ,_, I_PPIS1 knew_VVD is_VBZ six_MC hundred_NNO and_CC twenty_MC five_MC ,_, that_DD1 's_VBZ how_RRQ I_PPIS1 ,_, that_DD1 's_VBZ how_RRQ I_PPIS1 knew_VVD it_PPH1 's_VBZ ._. 
Anyway_RR we_PPIS2 get_VV0 these_DD2 complex_NN1 done_VDN ,_, and_CC you_PPY can_VM check_VVI that_DD1 ,_, and_CC that_DD1 fits_VVZ the_AT ,_, right_RR ,_, and_CC then_RT the_AT second_MD part_NN1 of_IO the_AT question_NN1 t_ZZ1 is_VBZ find_VV0 the_AT argument_NN1 Well_RR the_AT argument_NN1 ,_, remember_VV0 what_DDQ the_AT argument_NN1 is_VBZ ?_? 
It_PPH1 's_VBZ time_NNT1 by_II the_AT minus_NN1 one_MC1 ,_, which_DDQ bit_NN1 's_VBZ on_II top_NN1 ?_? 
The_AT imaginary_JJ bit_NN1 's_VBZ on_II top_NN1 ,_, so_CS I_PPIS1 've_VH0 got_VVN twenty_MC four_MC over_RG six_MC ,_, two_MC ,_, five_MC ,_, divide_VV0 by_II seven_MC to_TO go_VVI over_RG six_MC ,_, two_MC ,_, five_MC ._. 
Eh_UH ,_, have_VH0 you_PPY got_VVN fractions_NN2 like_II that_DD1 ?_? 
Something_PN1 over_RG six_MC hundred_NNO and_CC twenty_MC five_MC ,_, divided_VVN by_II something_PN1 over_RG six_MC hundred_NNO and_CC twenty_MC five_MC ,_, now_CS21 that_CS22 is_VBZ exactly_RR the_AT same_DA as_CSA just_RR a_AT1 twenty_MC four_MC over_RG seven_MC ,_, cos_CS the_AT six_MC twenty_MC five_MC will_VM cancel_VVI out_RP ._. 
If_CS I_PPIS1 do_VD0 twenty_MC four_MC divide_VV0 by_II seven_MC inverse_JJ time_NNT1 ,_, I_PPIS1 'll_VM get_VVI an_AT1 ._. 
Well_RR ,_, now_RT ,_, what_DDQ 's_VBZ the_AT anybody_PN1 got_VVD a_AT1 calculator_NN1 with_IW them_PPHO2 ?_? 
Twenty_MC four_MC divide_VV0 by_II seven_MC ,_, inverse_JJ time_NNT1 ,_, got_VVD a_AT1 ._. 
Well_RR what_DDQ sort_NN1 it_PPH1 out_RP ._. 
Twenty_MC four_MC ,_, divide_VV0 by_II seven_MC ,_, it_PPH1 's_VBZ three_MC point_NN1 six_MC ,_, ,_, I_PPIS1 mean_VV0 it_PPH1 's_VBZ definitely_RR of_IO degrees._NNU ,_, one_MC1 point_NN1 nine_MC degrees_NN2 ._. 
So_RR we_PPIS2 get_VV0 the_AT one_MC1 point_NN1 nine_MC degrees_NN2 ,_, now_RT ,_, we_PPIS2 've_VH0 got_VVN to_TO interpret_VVI that_CST now_RT ._. 
Now_RT ,_, you_PPY remember_VV0 the_AT really_RR big_JJ puzzle_NN1 on_II there_RL ,_, the_AT imaginary_JJ bit_NN1 goes_VVZ there_RL ,_, and_CC minus_II seven_MC of_IO something_PN1 along_II the_AT route_NN1 bit_NN1 and_CC minus_II twenty_MC four_MC of_IO them_PPHO2 ,_, so_CS I_PPIS1 'm_VBM going_VVG minus_II seven_MC six_MC hundred_NNO and_CC twenty_MC fifths_MF there_RL ,_, minus_II twenty_MC four_MC ,_, seven_MC ,_, so_CS the_AT actual_JJ lines_NN2 go_VV0 like_II that_DD1 ,_, so_CS the_AT one_MC1 point_NN1 nine_MC at_II that_DD1 angle_NN1 ,_, so_CS the_AT actual_JJ is_VBZ going_VVGK to_TO be_VBI which_DDQ is_VBZ two_MC sixty_MC one_MC1 point_NN1 nine_MC ._. 
Right_RR then_RT ,_, let_VM21 's_VM22 ,_, that_DD1 's_VBZ what_DDQ we_PPIS2 was_VBDZ doing_VDG ._. 
Now_RT if_CS ,_, well_RR ,_, certainly_RR there_EX 's_VBZ a_RR21 lot_RR22 more_RGR complicated_JJ things_NN2 in_II complex_JJ numbers_NN2 ,_, you_PPY should_VM ,_, all_DB you_PPY really_RR done_VDN ,_, is_VBZ to_TO ,_, this_DD1 thing_NN1 about_II the_AT complex_NN1 you_PPY get_VV0 them_PPHO2 work_VV0 out_RP some_DD algebra_NN1 ,_, you_PPY go_VV0 out_RP and_CC Z_ZZ1 square_VV0 some_DD algebra_NN1 and_CC then_RT you_PPY 've_VH0 done_VDN the_AT complex_NN1 with_IW some_DD algebra_NN1 and_CC with_IW the_AT use_NN1 of_IO plus_NN1 and_CC minus_NN1 signs_NN2 in_II there_RL ,_, it_PPH1 's_VBZ a_RR31 little_RR32 bit_RR33 tricky_JJ ,_, but_CCB nothing_PN1 ,_, that_DD1 ,_, that_DD1 ,_, at_II A_AT1 level_NN1 that_CST you_PPY should_VM n't_XX be_VBI able_JK to_TO handle_VVI ,_, right_RR ,_, and_CC once_CS you_PPY 've_VH0 got_VVN that_DD1 you_PPY look_VV0 for_IF some_DD new_JJ ,_, just_RR ,_, working_VVG and_CC the_AT least_RRT ,_, and_CC deciding_VVG what_DDQ happened_VVD when_CS you_PPY 've_VH0 actually_RR got_VVN ._. 
That_DD1 really_RR ,_, I_PPIS1 mean_VV0 that_DD1 's_VBZ six_MC marks_NN2 on_II the_AT yellow_JJ paper_NN1 ,_, at_II that_DD1 level_NN1 that_CST 's_VBZ really_RR six_MC per_NNU21 cent_NNU22 ,_, but_CCB really_RR it_PPH1 's_VBZ all_DB ,_, that_DD1 ,_, that_DD1 's_VBZ ,_, that_DD1 ,_, looking_VVG at_II that_DD1 ,_, that_DD1 is_VBZ one_MC1 of_IO the_AT easier_JJR questions_NN2 I_PPIS1 would_VM deal_VVI out_RP ,_, very_RG easy_JJ ._. 
That_DD1 's_VBZ definitely_RR one_MC1 of_IO the_AT easier_JJR questions_NN2 I_PPIS1 would_VM deal_VVI out_RP ._. 
No_UH ,_, ,_, all_DB the_AT complex_JJ numbers_NN2 that_CST you_PPY get_VV0 on_II that_DD1 ,_, on_II that_DD1 maths_NN1 ,_, are_VBR in_II similar_JJ ,_, you_PPY should_VM be_VBI able_JK to_TO do_VDI them_PPHO2 ,_, that_DD1 is_VBZ one_MC1 of_IO the_AT key_JJ questions_NN2 If_CS you_PPY think_VV0 this_DD1 is_VBZ hard_JJ ,_, wait_VV0 until_CS we_PPIS2 go_VV0 through_RP ,_, go_VV0 through_RP ,_, representing_VVG back_RP to_II equations_NN2 ._. 
Yeah_UH ._. 
No_AT worries_NN2 ._. 
Yeah_UH ._. 
You_PPY 'll_VM probably_RR be_VBI able_JK to_TO that._NNU yeah_UH probably_RR ._. 
Is_VBZ the_AT ,_, the_AT difficult_JJ stuff_NN1 ?_? 
Right_RR next_MD question_NN1 is_VBZ the_AT one_PN1 where_RRQ you_PPY 're_VBR given_VVN these_DD2 two_MC complex_JJ numbers_NN2 ,_, and_CC you_PPY 're_VBR asked_VVN to_TO show_VVI the_AT ,_, the_AT modules_NN2 of_IO Z_ZZ1 one_MC1 squared_JJ is_VBZ two_MC times_NNT2 the_AT modules_NN2 of_IO Z_ZZ1 two_MC squared_VVN ._. 
So_RR all_DB it_PPH1 is_VBZ ,_, is_VBZ ,_, says_VVZ ,_, sure_JJ that_CST that_DD1 's_VBZ that_DD1 ,_, so_RR what_DDQ I_PPIS1 'm_VBM gon_NN1 na_FW do_VD0 is_VBZ say_VVI the_AT modules_NN2 of_IO Z_ZZ1 one_MC1 is_VBZ the_AT square_JJ root_NN1 of_IO five_MC squared_VVN plus_II one_MC1 squared_JJ ,_, so_RR if_CS I_PPIS1 want_VV0 the_AT modules_NN2 of_IO Z_ZZ1 one_MC1 squared_JJ then_RT all_DB I_PPIS1 've_VH0 got_VVN is_VBZ five_MC squared_VVN plus_II one_MC1 squared_JJ ,_, cos_CS when_CS I_PPIS1 've_VH0 squared_VVN it_PPH1 ,_, it_PPH1 gets_VVZ rid_VVN of_IO the_AT square_JJ root_NN1 ,_, which_DDQ is_VBZ ,_, do_VD0 n't_XX you_PPY think_VVI ,_, ._. 
No_UH ,_, so_RR ,_, Z_ZZ1 two_MC is_VBZ the_AT square_JJ root_NN1 of_IO two_MC squared_VVN plus_II three_MC squared_VVN so_CS I_PPIS1 want_VV0 Z_ZZ1 two_MC square_JJ ,_, is_VBZ two_MC square_JJ plus_II three_MC square_JJ ,_, different_JJ in_II square_JJ root_NN1 ,_, so_CS the_AT two_MC times_NNT2 is_VBZ two_MC times_NNT2 ,_, well_RR two_MC square_NN1 is_VBZ four_MC plus_II that_DD1 ,_, ,_, that_DD1 is_VBZ that_DD1 ._. 
Right_RR next_MD one_PN1 ,_, which_DDQ is_VBZ find_VV0 the_AT argument_NN1 of_IO Z_ZZ1 one_MC1 times_II Z_ZZ1 two_MC Yeah_UH ,_, again_RT a_AT1 couple_NN1 of_IO different_JJ ways_NN2 of_IO doing_VDG it_PPH1 ,_, what_DDQ you_PPY can_VM do_VDI is_VBZ you_PPY find_VV0 the_AT argument_NN1 of_IO Z_ZZ1 one_MC1 ,_, find_VV0 the_AT argument_NN1 of_IO Z_ZZ1 two_MC ,_, and_CC then_RT what_DDQ ,_, what_DDQ will_VM we_PPIS2 do_VDI for_IF the_AT answers_NN2 ,_, add_VV0 them_PPHO2 together_RL to_TO get_VVI the_AT to_II ,_, arguments_NN2 to_II something_PN1 worth_II together_RL ,_, we_PPIS2 add_VV0 them_PPHO2 ,_, or_CC we_PPIS2 can_VM work_VVI out_RP Z_ZZ1 one_MC1 times_II Z_ZZ1 two_MC and_CC then_RT just_RR find_VV0 a_AT1 modulist_NN1 of_IO that_DD1 complex_JJ number_NN1 ,_, now_RT which_DDQ way_NN1 do_VD0 you_PPY want_VVI to_TO do_VDI it_PPH1 ?_? 
First_MD way_NN1 ._. 
Go_VV0 on_RP ,_, it_PPH1 's_VBZ up_II21 to_II22 you_PPY ._. 
Go_VV0 on_RP ._. 
John_NP1 said_VVD one._NNU working_VVG out_RP a_AT1 modules_NN2 you_PPY have_VH0 to_TO find_VVI the_AT Sorry_JJ did_VDD that_DD1 one_PN1 ,_, I_PPIS1 've_VH0 got_VVN to_TO accept_VVI it_PPH1 ,_, right_RR ,_, find_VV0 the_AT ,_, find_VV0 find_VV0 the_AT ,_, is_VBZ up_RP that_DD1 way_NN1 somewhere_RL ,_, that_DD1 's_VBZ fine_JJ ,_, that_DD1 's_VBZ one_PN1 ,_, argument_NN1 of_IO that_REX21 is_REX22 ,_, four_MC over_RG five_MC inverse_JJ time._NNU one_MC1 divided_VVN by_II five_MC ,_, inverse_JJ time_NNT1 Three_MC ,_, eight_MC ,_, one_MC1 ,_, seven_MC ._. 
Seventy_MC eh._NNU forty_MC five_MC degrees_NN2 ._. 
One_MC1 divided_VVN by_II five_MC ,_, have_VH0 you_PPY ever_RR put_VVN ,_, one_MC1 divided_VVN by_II five_MC ?_? 
Must_VM be_VBI less_DAR than_CSN one_MC1 five_MC .._... 
Yeah_UH ,_, we_PPIS2 're_VBR waiting_VVG for_IF a_AT1 ._. 
Good_JJ ,_, Z_ZZ1 two_MC is_VBZ minus_II two_MC plus_II three_MC ,_, minus_II two_MC plus_II three_MC I._NP1 So_RR that_DD1 's_VBZ two_MC ,_, that_DD1 's_VBZ three_MC ,_, so_RG three_MC ,_, one_MC1 forty_MC five_MC inverse_JJ time_NNT1 what_DDQ 'll_VM we_PPIS2 get_VVI ?_? 
One_MC1 point_NN1 five_MC inverse_JJ time_NNT1 ,_, fifty_MC six_MC point_NN1 three_MC is_VBZ in_II there_RL ,_, so_CS the_AT answer_NN1 we_PPIS2 want_VV0 is_VBZ minus_II two_MC ,_, one_MC1 ,_, three_MC one_MC1 ,_, two_MC ,_, three_MC ,_, ,_, seven_MC ,_, so_RR add_VV0 that_CST to_II and_CC I_PPIS1 hear_VV0 one_MC1 ,_, two_MC ,_, four_MC ,_, ._. 
So_RR that_DD1 's_VBZ R_ZZ1 Z_ZZ1 ,_, one_MC1 Z_ZZ1 two_MC ,_, that_DD1 's_VBZ two_MC R_ZZ221 's_ZZ222 together_RL and_CC then_RT ,_, what_DDQ I_PPIS1 calculate_VV0 the_AT side_NN1 B_ZZ1 ,_, the_AT square_JJ root_NN1 of_IO sixty_MC minus_II thirty_MC I_ZZ1 ,_, eh_UH this_DD1 about_II the_AT hardest_JJT figure_NN1 that_CST I_PPIS1 can_VM do_VDI in_II complex_JJ numbers_NN2 ,_, the_AT square_JJ root_NN1 of_IO sixteen_MC ,_, minus_II thirty_MC I._NP1 Must_VM n't_XX ,_, sixteen_MC minus_II thirty_MC I_ZZ1 ,_, but_CCB we_PPIS2 want_VV0 the_AT square_JJ root_NN1 of_IO that_DD1 ,_, to_TO begin_VVI plus_II D_MC times_NNT2 ._. 
Oops_UH then_RT if_CS I_PPIS1 square_RR both_DB2 sides_NN2 of_IO that_DD1 equation_NN1 ,_, then_RT sixteen_MC ,_, minus_II thirty_MC nine_MC equals_VVZ the_AT A_ZZ1 plus_II B_ZZ1 ,_, I_PPIS1 ,_, square_NN1 ,_, yeah_UH ,_, that_DD1 's_VBZ just_RR the_AT square_NN1 on_II both_DB2 sides_NN2 ,_, so_RG sixteen_MC minus_II thirty_MC nine_MC equals_NN2 square_VV0 this_DD1 out_RP under_II A_ZZ1 squared_VVN ,_, plus_II two_MC give_VV0 me_PPIO1 ,_, plus_II three_MC squared_VVN ,_, I_PPIS1 squared_VVD ._. 
Yeah_UH ,_, that_DD1 's_VBZ just_JJ algebra_NN1 ,_, that_DD1 's_VBZ just_RR what_DDQ planners_NN2 they_PPHS2 've_VH0 got_VVN ._. 
If_CS I_PPIS1 were_VBDR back_RP at_II the_AT A_ZZ1 squared_VVN ,_, I_PPIS1 squared_VVD is_VBZ minus_II one_MC1 ,_, so_CS I_PPIS1 've_VH0 got_VVN minus_II three_MC squared_VVN ,_, there_EX 's_VBZ two_MC give_VV0 me_PPIO1 by_II I_ZZ1 Equals_VVZ minus_II thirty_MC nine_MC ,_, now_RT because_CS those_DD2 two_MC complex_JJ numbers_NN2 are_VBR the_AT same_DA are_VBR the_AT same_DA ,_, so_RG sixteen_MC is_VBZ E_ZZ1 S_ZZ1 squared_VVN minus_II three_MC square_JJ ,_, the_AT imaginary_JJ grids_NN2 are_VBR also_RR the_AT same_DA ,_, so_RR minus_II thirty_MC equals_VVZ two_MC ,_, eight_MC B._NP1 Do_VD0 n't_XX really_RR imaginary_JJ grid_NN1 on_II this_DD1 side_NN1 ,_, imaginary_JJ grid_NN1 on_II that_DD1 side_NN1 ,_, from_II which_DDQ ,_, if_CS I_PPIS1 second_VV0 one_PN1 ,_, you_PPY can_VM see_VVI A_ZZ1 ,_, that_CST A_ZZ1 equals_VVZ minus_II fifteen_MC over_RG three_MC ._. 
There_RL take_VV0 for_IF two_MC and_CC what_DDQ are_VBR the_AT two_MC categories_NN2 turning_VVG to_TO get_VVI fifteen_MC over_RG three_MC ._. 
No_UH ,_, nothing_PN1 ,_, nothing_PN1 fantastic_JJ ,_, brilliant_JJ ,_, yet_RR ,_, then_RT substitute_VV0 all_DB that_CST into_II the_AT other_JJ one_PN1 ,_, so_RG sixteen_MC equals_NN2 minus_II fifteen_MC over_II B_ZZ1 squared_VVN minus_II B_ZZ1 squared_VVN ,_, still_RR nothing_PN1 fantastic_JJ eh_UH ,_, sixteen_MC equals_VVZ five_MC square_JJ when_CS I_PPIS1 get_VV0 two_MC ,_, two_MC ,_, five_MC ,_, over_RG three_MC squared_VVN minus_II three_MC squared_VVN ._. 
Yeah_UH ,_, that_DD1 's_VBZ just_RR square_JJ ._. 
Square_JJ root_NN1 has_VHZ becomes_VVZ ,_, fifteen_MC squared_VVN two_MC plus_II five_MC ,_, B_ZZ1 on_II the_AT boxed_JJ squared_JJ ,_, three_MC square_JJ ._. 
Get_VV0 rid_VVN of_IO the_AT ,_, nobody_PN1 has_VHZ any_DD questions_NN2 ?_? 
Multiply_VV0 through_II sixteen_MC B_ZZ1 square_JJ equals_NN2 two_MC ,_, two_MC ,_, five_MC minus_II B_ZZ1 to_II the_AT four_MC ,_, cos_CS B_ZZ1 squared_VVN have_VH0 B_NP1 squared_VVN ,_, multiply_VV0 B_ZZ1 square_JJ and_CC I_PPIS1 get_VV0 that_DD1 ._. 
Now_RT bring_VV0 it_PPH1 all_RR over_II the_AT left_JJ hand_NN1 side_NN1 and_CC we_PPIS2 'll_VM get_VVI B_ZZ1 to_II the_AT plus_NN1 sixteen_MC B_ZZ1 square_JJ ,_, minus_II two_MC ,_, two_MC ,_, five_MC equals_NN2 what_DDQ ?_? 
That_DD1 's_VBZ just_RR bringing_VVG that_DD1 minus_NN1 B_ZZ1 squared_VVN ,_, ,_, bring_VV0 that_DD1 to_II twenty_MC five_MC minus_NN1 ._. 
._. We_PPIS2 came_VVD to_TO find_VVI out_RP ._. 
Yeah_UH ._. 
Like_VV0 ,_, you_PPY got_VVD ,_, I_PPIS1 mean_VV0 put_VV0 the_AT other_JJ side_NN1 of_IO the_AT ._. 
Cos_CS what_DDQ we_PPIS2 're_VBR going_VVGK to_TO do_VDI now_RT ,_, is_VBZ real_JJ what_DDQ ,_, really_RR what_DDQ this_DD1 is_VBZ ,_, this_DD1 is_VBZ like_II a_AT1 quadratic_JJ equation_NN1 ,_, it_PPH1 is_VBZ B_ZZ1 square_JJ ,_, squared_VVN plus_II sixty_MC B_ZZ1 squared_VVN ,_, minus_II two_MC ,_, two_MC ,_, five_MC ,_, ,_, so_RR that_DD1 's_VBZ a_AT1 quadratic_JJ equation_NN1 ,_, but_CCB instead_II21 of_II22 saying_VVG X_ZZ1 square_JJ ,_, I_PPIS1 'm_VBM saying_VVG B_ZZ1 square_JJ ,_, square_NN1 ,_, plus_II sixteen_MC B_ZZ1 square_JJ ._. 
So_RR what_DDQ I_PPIS1 'm_VBM gon_NN1 na_FW do_VD0 is_VBZ use_NN1 the_AT ,_, let_VM21 's_VM22 see_VVI ,_, it_PPH1 's_VBZ minus_II three_MC ,_, plus_CC I_PPIS1 'll_VM minus_II the_AT square_NN1 in_II B_ZZ1 square_JJ ,_, sixteen_MC strand_NN1 ,_, minus_II four_MC times_NNT2 the_AT eight_MC ,_, nine_MC C_NP1 ,_, well_RR I_PPIS1 'm_VBM gon_NN1 na_FW do_VD0 that_DD1 ,_, four_MC times_NNT2 eight_MC ,_, nine_MC C_NP1 ,_, equals_VVZ plus_II nine_MC all_RR over_RP to_II A_ZZ1 ,_, just_RR two_MC ._. 
Ca_VM n't_XX you_PPY do_VDI the_AT main_JJ this_DD1 way_NN1 ?_? 
You_PPY ca_VM n't_XX evaporate_VVI it_PPH1 ,_, yeah_UH ._. 
It_PPH1 vaporises_VVZ fairly_RR easy_JJ ._. 
Well_RR I_PPIS1 got_VVD ._. 
Very_RG ,_, very_RG easily_RR vaporises_VVZ it_PPH1 ,_, but_CCB and_CC then_RT when_CS I_PPIS1 do_VD0 that_DD1 I_PPIS1 get_VV0 minus_II sixteen_MC plus_II I_MC1 minus_II the_AT square_JJ root_NN1 off_II one_MC1 thousand_NNO ,_, one_MC1 hundred_NNO and_CC fifty_MC six_MC ,_, all_RR over_RG two_MC ,_, plus_II minus_NN1 sixteen_MC ,_, plus_II or_CC minus_II what_DDQ 's_VBZ the_AT square_JJ root_NN1 of_IO one_MC1 thousand_NNO one_MC1 hundred_NNO and_CC fifty_MC six_MC ?_? 
Thirty_MC six_MC is_VBZ it_PPH1 ?_? 
I_PPIS1 do_VD0 n't_XX know_VVI ._. 
Thirty_MC four_MC oh_UH ,_, thirty_MC four_MC all_RR over_RG two_MC ._. 
All_RR over_RG two_MC ,_, then_RT if_CS you_PPY pass_VV0 ,_, spread_VV0 them_PPHO2 over_RP minus_II sixteen_MC add_VV0 thirty_MC four_MC gives_VVZ me_PPIO1 eighteen_MC over_RG two_MC ,_, or_CC if_CS I_PPIS1 do_VD0 minus_II thirty_MC four_MC I_PPIS1 get_VV0 nine_MC over_RG two_MC ,_, that_DD1 'll_VM be_VBI plus_II nine_MC or_CC even_RR minus_II twenty_MC five_MC Eh_UH ,_, start_VV0 off_RP with_IW ,_, cos_CS you_PPY 've_VH0 gone_VVN all_DB the_AT way_NN1 through_II that_DD1 ._. 
Yeah_UH ,_, eh_UH with_IW the_AT end_NN1 you_PPY could_VM have_VHI B_NP1 equals_VVZ minus_II fifteen_MC over_RL21 here_RL22 and_CC you_PPY would_VM have_VHI still_RR got_VVN the_AT same_DA answer_NN1 ._. 
Now_RT we_PPIS2 've_VH0 got_VVN this_RG far_RR ,_, so_RR ,_, now_RT remember_VV0 what_DDQ we_PPIS2 're_VBR doing_VDG ,_, we_PPIS2 're_VBR finding_VVG out_RP what_DDQ B_ZZ1 squared_VVN is_VBZ ,_, so_RG either_RR ,_, B_ZZ1 squared_VVN is_VBZ nine_MC or_CC B_ZZ1 squared_VVN is_VBZ minus_II twenty_MC five_MC ._. 
Yeah_UH ,_, now_RT then_RT ,_, one_MC1 of_IO the_AT things_NN2 ,_, when_CS we_PPIS2 get_VV0 this_DD1 complex_JJ numbers_NN2 and_CC B_ZZ1 ,_, itself_PPX1 is_VBZ a_AT1 real_JJ number_NN1 and_CC B_ZZ1 itself_PPX1 is_VBZ a_AT1 real_JJ number_NN1 ,_, right_RR ,_, plus_II B_ZZ1 ,_, I_PPIS1 ,_, is_VBZ actually_RR what_DDQ we_PPIS2 call_VV0 a_AT1 complex_JJ number_NN1 ,_, if_CS those_DD2 two_MC apart_RL ,_, they_PPHS2 're_VBR just_RR numbers_NN2 ._. 
So_RR we_PPIS2 ca_VM n't_XX have_VHI B_NP1 square_NN1 in_II twenty_MC five_MC ,_, twenty_MC five_MC cos_CS nothing_PN1 exists_VVZ ,_, there_RL twenty_MC five._NNU ,_, well_RR we_PPIS2 have_VH0 got_VVN complex_JJ numbers_NN2 ,_, but_CCB we_PPIS2 ca_VM n't_XX have_VHI B_NP1 itself_PPX1 in_II the_AT complex_JJ number_NN1 ,_, right_RR ,_, so_CS B_ZZ1 square_NN1 must_VM be_VBI nine_MC ,_, so_RG either_RR B_ZZ1 is_VBZ plus_II three_MC or_CC B_ZZ1 is_VBZ minus_II three_MC ,_, one_MC1 or_CC the_AT two_MC Now_RT if_CS B_ZZ1 is_VBZ plus_II three_MC ,_, then_RT going_VVG back_RP to_II me_PPIO1 formula_NN1 here_RL is_VBZ going_VVGK to_TO be_VBI minus_II five_MC ,_, cos_CS if_CS I_PPIS1 put_VV0 the_AT three_MC in_II it_PPH1 there_RL ,_, I_PPIS1 get_VV0 minus_II five_MC from_II there_RL ._. 
And_CC if_CS B_ZZ1 is_VBZ minus_II three_MC ,_, then_RT here_RL is_VBZ plus_II three_MC ,_, plus_II five._NNU ,_, so_CS the_AT complex_JJ number_NN1 that_CST is_VBZ the_AT square_JJ root_NN1 ,_, is_VBZ either_RR two_MC in_II that_DD1 pair_NN ,_, minus_II five_MC ,_, plus_II three_MC ,_, nine_MC ,_, or_CC it_PPH1 is_VBZ five_MC minus_II three_MC ,_, nine_MC ,_, so_CS it_PPH1 's_VBZ either_RR that_CST one_PN1 ,_, or_CC it_PPH1 's_VBZ that_DD1 one_PN1 ,_, and_CC we_PPIS2 can_VM write_VVI that_DD1 down_RP very_RG ,_, very_RG simply_RR because_CS that_DD1 one_PN1 and_CC that_CST one_MC1 are_VBR just_RR the_AT opposite_JJ sides_NN2 ,_, but_CCB either_RR plus_II or_CC minus_NN1 ._. 
I_PPIS1 suppose_VV0 ._. 
Three_MC ,_, five_MC ,_, and_CC when_CS you_PPY 've_VH0 worked_VVN these_DD2 square_JJ roots_NN2 out_RP ,_, they_PPHS2 always_RR come_VV0 out_RP the_AT opposites_NN2 sides_NN2 ,_, it_PPH1 's_VBZ always_RR plus_II or_CC minus_NN1 ,_, ,_, always_RR ,_, always_RR ,_, always_RR ._. 
When_CS you_PPY work_VV0 these_DD2 square_JJ root_NN1 things_NN2 out_RP ,_, whatever_DDQV square_JJ root_NN1 is_VBZ ,_, it_PPH1 's_VBZ always_RR one_MC1 ,_, like_II one_MC1 plus_II three_MC ,_, minus_II five_MC ,_, the_AT other_JJ one_MC1 's_GE minus_NN1 three_MC plus_II five_MC ,_, they_PPHS2 're_VBR always_RR like_II that_DD1 ._. 
Cos_CS they_PPHS2 're_VBR what_DDQ we_PPIS2 call_VV0 complex_JJ conjugals_NN2 ._. 
Do_VD0 we_PPIS2 gets_VVZ points_NN2 then_RT sir_NN1 ,_, if_CS the_AT other_JJ one_PN1 was_VBDZ twenty_MC five_MC ?_? 
Yeah_UH ,_, it_PPH1 's_VBZ just_RR pure_JJ coincidence_NN1 ,_, it_PPH1 's_VBZ just_RR the_AT way_NN1 that_CST trotting_VVG around_RP ,_, I_PPIS1 think_VV0 what_DDQ we_PPIS2 're_VBR trying_VVG to_TO do_VDI was_VBDZ to_TO say_VVI ,_, something_PN1 wrong_JJ in_II exam_NN1 book_NN1 ,_, plus_NN1 ,_, plus_NN1 ,_, which_DDQ is_VBZ not_XX liked_VVN ,_, but_CCB ,_, I_PPIS1 do_VD0 n't_XX think_VVI they_PPHS2 are_VBR the_AT alike_JJ ._. 
Cos_CS they_PPHS2 do_VD0 n't_XX actually_RR ,_, if_CS you_PPY do_VD0 something_PN1 like_VVI that_DD1 ,_, say_VV0 you_PPY put_VV0 plus_II five_MC ,_, minus_II five_MC and_CC then_RT sit_VV0 down_RP and_CC ,_, you_PPY 're_VBR the_AT one_PN1 that_CST plus_II three_MC and_CC minus_II three_MC you_PPY do_VD0 n't_XX actually_RR lose_VVI marks_NN2 doing_VDG something_PN1 wrong_JJ ,_, you_PPY can_VM not_XX be_VBI penalised_VVN for_IF doing_VDG it_PPH1 wrong_RR ,_, you_PPY can_VM only_RR gain_VVI credit_NN1 for_IF doing_VDG something_PN1 right_RR ,_, because_CS they_PPHS2 'll_VM ,_, give_VV0 you_PPY five_MC marks_NN2 to_II doing_VDG that_DD1 bit_NN1 right_NN1 and_CC then_RT knock_VV0 three_MC off_RP for_IF doing_VDG something_PN1 else_RR wrong_JJ ,_, they_PPHS2 ,_, they_PPHS2 would_VM never_RR give_VVI you_PPY penalty_NN1 marks_NN2 ,_, they_PPHS2 will_VM only_RR credit_VVI for_IF doing_VDG things_NN2 right_RR ,_, but_CCB so_RG often_RR it_PPH1 's_VBZ quite_RR like_VV0 down_RP as_CSA you_PPY want_VV0 ,_, you_PPY ca_VM n't_XX ._. 
All_DB that_DD1 's_VBZ doing_VDG is_VBZ ,_, is_VBZ the_AT account_NN1 against_II this_DD1 sort_NN1 of_IO idea_NN1 that_CST you_PPY can_VM always_RR do_VDI it_PPH1 ._. 
Yeah_UH ._. 
Or_CC like_JJ people_NN come_VV0 to_II you_PPY getting_VVG forty_MC per_NNU21 cent_NNU22 and_CC forty_MC per_NNU21 cent_NNU22 was_VBDZ ,_, of_IO these_DD2 ,_, ,_, then_RT ,_, the_AT ,_, he_PPHS1 was_VBDZ was_VBDZ not_XX as_RG good_JJ as_CSA that_DD1 one_PN1 ,_, but_CCB that_DD1 one_PN1 gets_VVZ the_AT B_ZZ1 ,_, that_CST one_PN1 gets_VVZ the_AT C_NP1 ,_, so_CS you_PPY wan_VV0 na_FU ._. 
That_DD1 's_VBZ an_AT1 interesting_JJ point_NN1 that_CST ,_, any_DD square_JJ root_NN1 ,_, any_DD square_JJ root_NN1 you_PPY always_RR get_VV0 two_MC answers_NN2 for_IF square_NN1 roots_VVZ yeah_UH ,_, it_PPH1 's_VBZ always_RR plus_II thing_NN1 and_CC minus_NN1 thing_NN1 ,_, in_II complex_JJ numbers_NN2 ,_, when_CS you_PPY get_VV0 complex_JJ numbers_NN2 there_EX are_VBR always_RR what_DDQ we_PPIS2 call_VV0 complex_JJ conjugators_NN2 ,_, if_CS you_PPY drew_VVD them_PPHO2 on_II them_PPHO2 ,_, on_II them_PPHO2 diagram_NN1 ,_, right_RR ,_, if_CS you_PPY drew_VVD them_PPHO2 on_II the_AT diagram_NN1 ,_, what_DDQ 'll_VM you_PPY get_VVI ,_, plus_II five_MC minus_II three_MC I_ZZ1 ,_, plus_II five_MC ,_, minus_II three_MC I_ZZ1 ,_, and_CC then_RT and_CC then_RT we_PPIS2 get_VV0 minus_II five_MC ,_, plus_II three_MC I_ZZ1 ,_, You_PPY get_VV0 plus_II and_CC minus_NN1 there_RL ._. 
Pardon_NN1 ?_? 
That_DD1 's_VBZ ,_, but_CCB that_DD1 is_VBZ the_AT hardest_JJT thing_NN1 ,_, now_RT the_AT hard_JJ thing_NN1 about_II that_DD1 is_VBZ not_XX actual_JJ complex_JJ numbers_NN2 ,_, it_PPH1 's_VBZ sort_RR21 of_RR22 these_DD2 equations_NN2 which_DDQ is_VBZ something_PN1 else_RR you_PPY 've_VH0 done_VDN ,_, equations_NN2 ,_, but_CCB the_AT other_JJ one_PN1 ,_, have_VH0 n't_XX really_RR got_VVN time_NNT1 ,_, the_AT other_JJ one_PN1 complex_JJ numbers_NN2 said_VVD what_DDQ it_PPH1 said_VVD to_II given_JJ by_II that_DD1 ,_, you_PPY 've_VH0 got_VVN to_TO draw_VVI them_PPHO2 two_MC on_II a_AT1 diagram_NN1 ,_, that_DD1 ,_, very_RG very_RG slow_JJ ,_, calculate_VV0 the_AT modules_NN2 as_CSA Z_ZZ1 more_RRR minus_II Z_ZZ1 two_MC ,_, what_DDQ work_VV0 is_VBZ what_DDQ Z_ZZ1 one_MC1 minus_II two_MC is_VBZ ,_, they_PPHS2 work_VV0 in_II modules_NN2 ._. 
Work_VV0 out_RP what_DDQ Z_ZZ1 one_MC1 divided_VVN by_II Z_ZZ1 two_MC is_VBZ ,_, and_CC then_RT find_VV0 the_AT argument_NN1 of_IO it_PPH1 and_CC give_VV0 your_APPGE answer_NN1 in_II ratings_NN2 ,_, there_RL ._. 
The_AT last_MD little_JJ bit_NN1 it_PPH1 says_VVZ ,_, give_VV0 your_APPGE answer_NN1 in_II ratings_NN2 ,_, suppose_VV0 W_ZZ1 ,_, right_RR I_PPIS1 just_RR ,_, suppose_VV0 W_ZZ1 had_VHD the_AT seven_MC plus_II fifteen_MC I_ZZ1 ,_, how_RRQ you_PPY gon_NN1 na_FW get_VV0 R_ZZ1 ,_, W_ZZ1 in_II ratings_NN2 ?_? 
Well_RR one_MC1 way_NN1 you_PPY can_VM do_VDI it_PPH1 ,_, is_VBZ press_NN1 the_AT ratings_NN2 button_VV0 on_II your_APPGE calculator_NN1 ,_, press_VV0 fifteen_MC divide_VV0 by_II seven_MC and_CC then_RT press_VV0 the_AT ratings_NN2 button_VV0 ,_, so_RR ,_, just_RR do_VD0 that_DD1 ,_, change_VV0 it_PPH1 on_II the_AT ratings_NN2 one_MC1 ,_, yeah_UH ,_, press_VV0 fifteen_MC divide_VV0 by_II seven_MC ,_, in_RP ._. 
One_MC1 point_NN1 one_MC1 ,_, three_MC ,_, four_MC ._. 
One_MC1 point_NN1 one_MC1 ,_, three_MC ,_, four_MC ,_, right_RR ,_, one_MC1 point_NN1 one_MC1 ,_, three_MC ,_, four_MC ,_, right_RR ,_, OK_RR do_VD0 it_PPH1 like_VVI that_DD1 ,_, although_CS that_DD1 does_VDZ n't_XX mean_VVI anything_PN1 at_RR21 all_RR22 here_RL ,_, that_DD1 's_VBZ the_AT right_JJ answer_NN1 ,_, because_CS you_PPY ,_, you_PPY 've_VH0 in_II ratings_NN2 ,_, right_RR ,_, if_CS you_PPY wanted_VVD to_TO ,_, put_VV0 it_PPH1 back_RP on_II degrees_NN2 ,_, ah_UH now_RT press_VV0 fifteen_MC divide_VV0 by_II seven_MC equals_NN2 and_CC then_RT press_VV0 inverse_NN1 ._. 
Sixty_MC four_MC point_NN1 nine_MC ._. 
Sixty_MC four_MC point_NN1 nine_MC ,_, well_RR sixty_MC five_MC point_VV0 nought_PN1 degrees_NN2 ,_, so_RG sixty_MC five_MC degrees_NN2 technically_RR ,_, right_RR ,_, that_DD1 number_NN1 is_VBZ sixty_MC five_MC degrees_NN2 ,_, now_RT ,_, one_MC1 pi_NN1 is_VBZ one_MC1 hundred_NNO and_CC eighty_MC ,_, pi_NN1 is_VBZ the_AT same_DA as_CSA one_MC1 hundred_NNO and_CC eighty_MC degrees_NN2 ,_, so_RR if_CS we_PPIS2 've_VH0 got_VVN sixty_MC five_MC degrees_NN2 what_DDQ we_PPIS2 've_VH0 got_VVN is_VBZ sixty_MC five_MC over_RG a_AT1 hundred_NNO and_CC eighty_MC ,_, pi_NN1 ._. 
Sorry_JJ ?_? 
Do_VD0 that_DD1 ,_, do_VD0 that_DD1 on_II sixty_MC five_MC divide_VV0 by_II one_MC1 hundred_NNO and_CC eighty_MC ,_, multiply_VV0 by_II the_AT pi_NN1 on_II your_APPGE calculator_NN1 ,_, just_RR one_MC1 second_NNT1 Robin_NP1 ,_, yeah_UH ,_, it_PPH1 's_VBZ usually_RR ,_, it_PPH1 's_VBZ just_RR theatrical_JJ ,_, you_PPY should_VM get_VVI ,_, yeah_UH ,_, so_CS you_PPY get_VV0 the_AT same_DA answer_NN1 ,_, so_CS you_PPY can_VM either_RR work_VVI it_PPH1 on_II ratings_NN2 or_CC you_PPY can_VM write_VVI it_PPH1 like_II that_DD1 ,_, you_PPY could_VM 've_VHI actually_RR left_VVN it_PPH1 like_II that_DD1 ,_, if_CS you_PPY come_VV0 to_II the_AT third_MD by_II ,_, you_PPY put_VV0 thirteen_MC over_II what_DDQ is_VBZ it_PPH1 ?_? eh_UH Multiple_NN1 fifteen_MC ._. 
