Example sentences of "one plus [noun] " in BNC.
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1 | Alright , so if we tr subtract B from A everything drops out apart from the following , so you have Y T minus lander Y T minus one plus B minus A , right equals alpha into Y minus lander plus beta X T okay . |
2 | Erm resistance one plus resistance two divide by is it ? |
3 | Right , similarly at time T minus one we have Y , Y T minus one equals alpha plus beta X T minus one plus lander plus lander X T minus two , plus lander squared X T minus three plus X T minus four infinity again we call that B and that 's just the same equation but we just erm shifted the subscripts and right , this explains why in T , this ex explains why in T minus one right , all the subscripts have just been just been changed . |
4 | Right , well if we multiply both sides , we multiply both sides of B right , by this co-efficient lander alright , we get right , lander by T minus one , lander erm right then what we do is that we get beta into lander X T minus one plus lander squared , X T minus two lander cubed , X T minus three , and lander to four X T minus four and so on and so s so on until infinity right . |
5 | D equals C log to the base E of one plus root L squared plus C squared |
6 | Certainly , one plus point is that you can record three to four hours of material onto the one tape . |
7 | It did show excellent character to bounce back from the start … one plus point from the first half . |
8 | So we combine those two hypothes hypotheses right , we get S T equals alpha delta gamma plus open brackets open the second set of brackets one minus delta close brackets open brackets , one minus gamma close brackets into S T minus one minus open brackets , one minus delta one minus gamma into S T minus two right , plus beta , delta , gamma into P T minus one plus E T minus open brackets , one minus gamma times E T minus one , right . |
9 | Now , looks pretty horrendous alright , but if we bum data on S T , S T minus one , S T minus two and P T minus one , all actual variables , if we bung those into the microfit and ask them to form the regression , it would do , right , it would just you 'd get S T equals A plus B that 's T minus one plus C A T minus two plus D A T minus one alright , and B T So before we we 'll call that equation four right , so although it looks nasty alright it 's fairly straightforward , it 's all , all we 're doing is , we 'd be asking the computer to regress S T on constant like how you would yourself T minus one to like values T minus two and like prices okay . |