Is it true that since sin2x+cos2x = 1, then sin(x)+cos(x) = 1? Explain your answer.

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N P · Answer 1 · 2018-04-10T23:09:37+0000

Answer with Step-by-step explanation:

We are given that it is true since

sin2x+ cos2x=1 then
sinx+cosx=1

We have to prove that

We know that

Substituting the values then we get

2sinxcosx+2cos^2x-1=1

2sinxcosx+2cos^2x=1+1

2(sinxcosx+cos^2x)=2

sinxcosx+cos^2x-1=0

cos^2x+sinxcosx=1

cosx(cosx+sinx)=1

cosx=1,cosx+sinx=1

Hence,

Abiessu · Answer 2 · 2018-04-14T17:20:44+0000

sin2x+cos2x=1
2sinxcosx+2cos^2x-1=1
2cosx(cosx+sinx-1)=0
2cosx=0 cosx+sinx=1
True

I did this with double angle formulas. sin2x=2sinxcosx, and cos2x=2cos^x-1. With plugging this in, I used factoring. At the end, there are two factors. One of the factors is cosx+sinx-1=0, which is cosx+sinx=1. Therefore, the answer is true.

Is it true that since sin2x+cos2x = 1, then sin(x)+cos(x) = 1? Explain your answer.

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