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Example Questions
Example Question #1 : Factoring Trigonometric Equations
Factor .
Don't get scared off by the fact we're doing trig functions! Factor as you normally would. Because our middle term is negative (), we know that the signs inside of our parentheses will be negative.
This means that can be factored to or .
Example Question #1 : Factoring Trigonometric Equations
Which of the following values of in radians satisfy the equation
3 only
1 only
2 only
1 and 2
1, 2, and 3
1 only
The fastest way to solve this equation is to simply try the three answers. Plugging in gives
Our first choice is valid.
Plugging in gives
However, since is undefined, this cannot be a valid answer.
Finally, plugging in gives
Therefore, our third answer choice is not correct, meaning only 1 is correct.
Example Question #2 : Factoring Trigonometric Equations
Find the zeros of the above equation in the interval
.
Therefore,
and that only happens once in the given interval, at , or 45 degrees.
Example Question #3 : Factoring Trigonometric Equations
Factor the expression
We have .
Now since
This last expression can be written as :
.
This shows the required result.
Example Question #2 : Factoring Trigonometric Equations
Factor the following expression:
We know that we can write
in the following form
.
Now taking ,
we have:
.
This is the result that we need.
Example Question #5 : Factoring Trigonometric Equations
We accept that :
What is a simple expression of
First we see that :
.
Now letting
we have
We know that :
and we are given that
, this gives
Example Question #5 : Factoring Trigonometric Equations
Factor the following expression:
We can't factor this expression.
Note first that:
and :
.
Now taking . We have
.
Since and .
We therefore have :
Example Question #6 : Factoring Trigonometric Equations
Factor the following expression
where is assumed to be a positive integer.
We cannot factor the above expression.
We cannot factor the above expression.
Letting , we have the equivalent expression:
.
We cant factor since .
This shows that we cannot factor the above expression.
Example Question #3 : Factoring Trigonometric Equations
Factor
We first note that we have:
Then taking , we have the result.
Example Question #4 : Factoring Trigonometric Equations
Find a simple expression for the following :
First of all we know that :
and this gives:
.
Now we need to see that: can be written as
and since
we have then:
.
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