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Polynomials Question. (1 Viewer)
- Thread starter shaon0
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Re: 回复: Polynomials Question.
Another question on polynomials:
i) Write an expression for sin@ in terms of t=tan(0.5@)
ii) Hence solve sin@ + cot(0.5@)=2.
I am mainly having trouble with how to obtain:
sin@ in terms of t and i also don't get 't method' which may be tested (MX1 test is tomorrow)
Thanks.tommykins said:
Another question on polynomials:
i) Write an expression for sin@ in terms of t=tan(0.5@)
ii) Hence solve sin@ + cot(0.5@)=2.
I am mainly having trouble with how to obtain:
sin@ in terms of t and i also don't get 't method' which may be tested (MX1 test is tomorrow)
tommykins
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回复: Re: 回复: Polynomials Question.
Draw the triangle, and you will realise that the opposite hypotenuse will be 1+t^2.
sin@ = O/H = 2t/1+t^2
ii) sin@ + cot(@/2) = 2
We know that t = tan(@/2), therfore cot(@/2) = 1/t
[2t/(1-t^2)] + 1/t = 2
Multiply by 1-t^2 and then t and solve for t.
Then revert to the fact that t = tan(@/2) and solve for @.
i) if t = tan(@/2) then tan@ = tan(@/2 + @/2) = 2t/1-t^2 (just expand using double angle rule).shaon0 said:Thanks.
Another question on polynomials:
i) Write an expression for sin@ in terms of t=tan(0.5@)
ii) Hence solve sin@ + cot(0.5@)=2.
I am mainly having trouble with how to obtain:
sin@ in terms of t and i also don't get 't method' which may be tested (MX1 test is tomorrow)
Draw the triangle, and you will realise that the opposite hypotenuse will be 1+t^2.
sin@ = O/H = 2t/1+t^2
ii) sin@ + cot(@/2) = 2
We know that t = tan(@/2), therfore cot(@/2) = 1/t
[2t/(1-t^2)] + 1/t = 2
Multiply by 1-t^2 and then t and solve for t.
Then revert to the fact that t = tan(@/2) and solve for @.