Question #96293

1 Answer
Harold Walden
Jan 19, 2018

On the domain, {x in R|0<=x<=2pi}

x=(pi)/6, x=(5pi)/6 ,x=(7pi)/6, x=(11pi)/6

Or, in degrees;

On the domain, {x in R|0^@<=x<=360^@}

x=30^@, x=150^@ ,x=210^@, x=330^@

Explanation:

You are going to need to use the pythagorean identity (sin^2x+cos^2x=1) to solve this problem.

7 sin^2x+3 cos^2x=4

As, sin^2x+cos^2x=1 then; cos^2x=1-sin^2x which we can use to substitute into the given equation.

7 sin^2x+3 (color(red)(1-sin^2x))=4

7sin^2x+3-3sin^2x=4

Combining like terms;

4sin^2x+3=4

Moving all of the information to the left of the equality yields;

4sin^2x-1=0

The next clever piece of maths comes because you will need to factorise this expression. So what we do is substitute a variable in for the trigonometric ratio.

i.e. let u=sinx

:. 4sin^2x-1=4u^2-1=0

Which we can factorise using the difference of perfect squares.

4u^2-1=(2u+1)(2u-1)=0

By the null factor law we can conclude that u=+-1/2

:. sinx=+-1/2

So, on the domain, {x in R|0<=x<=2pi}

x=(pi)/6, x=(5pi)/6 ,x=(7pi)/6, x=(11pi)/6

Or, in degrees;

On the domain, {x in R|0^@<=x<=360^@}

x=30^@, x=150^@ ,x=210^@, x=330^@

I hope that helps :)

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