All High School Math Resources
Example Questions
Example Question #3 : Trigonometric Functions And Graphs
What is the amplitude of ?
The amplitude of a wave function like is always going to be the coefficient of the function. In this case, that is .
Example Question #1 : Understanding Period And Amplitude
What is the local maximum of between and ?
The fastest way to solve this problem is to graph it and observe the answer. However, the other option is to think of this equation in terms of period.
When the coefficient of the variable increases, the frequency increases and the period decreases by that rate.
Since our equation is , our period will be the normal period of a wave. Since only the period is changing, the amplitude is not. Therefore the amplitude (the highest and lowest points) of will be the same as that of . The amplitude of a sine wave is , so the amplitude of will also be .
Therefore, our maximum will be .
Example Question #2 : Period And Amplitude
Which of the given functions has the greatest amplitude?
The amplitude of a function is the amount by which the graph of the function travels above and below its midline. When graphing a sine function, the value of the amplitude is equivalent to the value of the coefficient of the sine. Similarly, the coefficient associated with the x-value is related to the function's period. The largest coefficient associated with the sine in the provided functions is 2; therefore the correct answer is .
The amplitude is dictated by the coefficient of the trigonometric function. In this case, all of the other functions have a coefficient of one or one-half.
Example Question #1 : Trigonometric Identities
What is the of ?
When working with basic trigonometric identities, it's easiest to remember the mnemonic: .
When one names the right triangle, the opposite side is opposite to the angle, the adjacent side is next to the angle, and the hypotenuse spans the two legs of the right angle.
Example Question #2 : Trigonometric Identities
Simplify .
Simplifying trionometric expressions or identities often involves a little trial and error, so it's hard to come up with a strategy that works every time. A lot of times you have to try multiple strategies and see which one helps.
Often, if you have any form of or in an expression, it helps to rewrite it in terms of sine and cosine. In this problem, we can use the identities and .
.
This doesn't seem to help a whole lot. However, we should recognize that because of the Pythagorean identity .
We can cancel the terms in the numerator and denominator.
.
Example Question #2 : Trigonometric Identities
What is the of ?
When working with basic trigonometric identities, it's easiest to remember the mnemonic: .
,
When one names the right triangle, the opposite side is opposite to the angle, the adjacent side is next to the angle, and the hypotenuse spans the two legs of the right angle.
Example Question #3 : Trigonometric Identities
What is the of ?
When working with basic trigonometric identities, it's easiest to remember the mnemonic: .
,
When one names the right triangle, the opposite side is opposite to the angle, the adjacent side is next to the angle, and the hypotenuse spans the two legs of the right angle.
Example Question #1 : Trigonometric Identities
Simplify
. Thus:
Example Question #1841 : High School Math
Simplify
and
.
Example Question #6 : Trigonometric Identities
Simplify .
Remember that . We can rearrange this to simplify our given equation: