Trig question (1 Viewer)

big_bang344 · Nov 29, 2011

Can someone help me with this question?

Evaluate: sin (45 - x) cos (45 - x)

I know it's easy but i just cant figure it out!

stevey6404 · Nov 29, 2011

big_bang344 said:
Can someone help me with this question?

Evaluate: sin (45 - x) cos (45 - x)

I know it's easy but i just cant figure it out!

Use the sin (a-b) rule and cos (a-b) rule?

= (sin45cosx - cos45sinx) (cos45cosx + sin45sinx)
= (1/root 2 cosx - 1/root 2 sinx) (1/root 2 cosx + 1/root 2 sinx)
= you can see it.

etc.

*shrugs* HSC's way too long ago.

SpiralFlex · Nov 29, 2011

Let's recall a famous identity,

$2\sin \alpha \cos \alpha = \sin 2\alpha$

$\sin \alpha \cos \alpha = \frac{\sin 2\alpha }{2}$

We can apply this to the question. Let $\alpha =x$

$\sin (45 - x) \cos (45 - x)= \frac{\sin [2(45-x)]}{2}$

$=\frac{\sin (90-2x)}{2}$

Ah, we get a complementary angle!

$=\frac{\cos 2x}{2}$

If you are wondering...

What is a complementary angle?

----Understanding---- (Not part of proof)

Consider the following pretty diagram.

I will call the hypotenuse $h$ .

So from the diagram,

$\cos 2x=\frac{x}{h}$

$\sin (90-2x)=\frac{x}{h}$

$\therefore \cos 2x=\sin (90-2x)$

BadMeetsEvil · Nov 29, 2011

compound angle, i think that's what it's called, where you expand the double angle inside sin and cos

=(sin45cosx-cos45sinx)(cos45cosx+sin45sinx)

=(1/sqroot(2)cosx-1/sqroot(2)sinx)(1/sqroot(2)cosx+1/sqroot(2)sinx)

simplify it

you get

1/sqroot(2)(cosx-sinx)(cosx+sinx)

and difference between to squares

=1/sqroot(2)(cosx(squared)-sinx(squared))

big_bang344 · Nov 29, 2011

Thanks Spi! And Badmeetsevil, are you playing CSS right now?

BadMeetsEvil · Nov 30, 2011

lol no and I don't play it

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