Factoring Trigonometric Equations - Trigonometry

Card 0 of 48

Find the zeros of the above equation in the interval

$[0,\pi]$ .

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$=1-2\sin(x)cos(x)=0$

Therefore,

$$\frac{1}{2}$=sin(x)cos(x)$

and that only happens once in the given interval, at $\frac{\pi}{4}$ , or 45 degrees.

$\sin\bigg($\frac{\pi}{4}$\bigg)\cos\bigg($\frac{\pi}{4}$\bigg)=\frac{1}{\sqrt2}$\cdot $\frac{1}{\sqrt2}$=\frac{1}{2}$$

Factor $1-2\cos $x+\cos^2$ x$ .

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Don't get scared off by the fact we're doing trig functions! Factor as you normally would. Because our middle term is negative ( $-2\cos x$ ), we know that the signs inside of our parentheses will be negative.

This means that $1-2\cos $x+\cos^2$ x$ can be factored to $(1-\cos x)(1-\cos x)$ or $(1-\cos $x)^2$$ .

Which of the following values of in radians satisfy the equation

$\frac{\pi}{4}$

$\frac{\pi}{2}$

$\frac{3\pi}{4}$

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The fastest way to solve this equation is to simply try the three answers. Plugging in $\frac{\pi}{4}$ gives

Our first choice is valid.

Plugging in $\frac{\pi}{2}$ gives

However, since $tan($\frac{\pi}${}2)$ is undefined, this cannot be a valid answer.

Finally, plugging in $\frac{3\pi}{4}$ gives

Therefore, our third answer choice is not correct, meaning only 1 is correct.

Factor the following expression:

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Note first that:

and :

.

Now taking $a=cosx \quad b=sinx$ . We have

.

Since and .

We therefore have :

Factor the expression

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We have .

Now since

This last expression can be written as :

.

This shows the required result.

Factor the following expression

where is assumed to be a positive integer.

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Letting , we have the equivalent expression:

.

We cant factor since .

This shows that we cannot factor the above expression.

We accept that :

What is a simple expression of

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First we see that :

.

Now letting

we have

We know that :

and we are given that

, this gives

Factor

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We first note that we have:

Then taking , we have the result.

Find a simple expression for the following :

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First of all we know that :

and this gives:

.

Now we need to see that: can be written as

and since

we have then:

.

Factor the following expression:

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We know that we can write

in the following form

.

Now taking ,

we have:

.

This is the result that we need.

What is a simple expression for the formula:

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From the expression :

we have:

Now since we know that :

. This expression becomes:

.

This is what we need to show.

Factor:

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Step 1: Recall the difference of squares (or powers of four) formula:

Step 2: Factor the question:

Factor more:

Step 3: Recall a trigonometric identity:

.. Replace this

Final Answer:

Find the zeros of the above equation in the interval

$[0,\pi]$ .

Tap to see back →

$=1-2\sin(x)cos(x)=0$

Therefore,

$$\frac{1}{2}$=sin(x)cos(x)$

and that only happens once in the given interval, at $\frac{\pi}{4}$ , or 45 degrees.

$\sin\bigg($\frac{\pi}{4}$\bigg)\cos\bigg($\frac{\pi}{4}$\bigg)=\frac{1}{\sqrt2}$\cdot $\frac{1}{\sqrt2}$=\frac{1}{2}$$

Factor $1-2\cos $x+\cos^2$ x$ .

Tap to see back →

Don't get scared off by the fact we're doing trig functions! Factor as you normally would. Because our middle term is negative ( $-2\cos x$ ), we know that the signs inside of our parentheses will be negative.

This means that $1-2\cos $x+\cos^2$ x$ can be factored to $(1-\cos x)(1-\cos x)$ or $(1-\cos $x)^2$$ .

Which of the following values of in radians satisfy the equation

$\frac{\pi}{4}$

$\frac{\pi}{2}$

$\frac{3\pi}{4}$

Tap to see back →

The fastest way to solve this equation is to simply try the three answers. Plugging in $\frac{\pi}{4}$ gives

Our first choice is valid.

Plugging in $\frac{\pi}{2}$ gives

However, since $tan($\frac{\pi}${}2)$ is undefined, this cannot be a valid answer.

Finally, plugging in $\frac{3\pi}{4}$ gives

Therefore, our third answer choice is not correct, meaning only 1 is correct.

Factor the following expression:

Tap to see back →

Note first that:

and :

.

Now taking $a=cosx \quad b=sinx$ . We have

.

Since and .

We therefore have :

Factor the expression

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We have .

Now since

This last expression can be written as :

.

This shows the required result.

Factor the following expression

where is assumed to be a positive integer.

Tap to see back →

Letting , we have the equivalent expression:

.

We cant factor since .

This shows that we cannot factor the above expression.

We accept that :

What is a simple expression of

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First we see that :

.

Now letting

we have

We know that :

and we are given that

, this gives

Factor

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We first note that we have:

Then taking , we have the result.