amplitude is 3 and period of π
Question
amplitude is 3 and period of π
Solution
It seems like you're referring to a trigonometric function, possibly a sine or cosine function.
The amplitude of a function is its peak value. In this case, the amplitude is 3, which means the function reaches a maximum height of 3 units above and below its midline.
The period of a function is the distance required for the function to complete one full cycle. In this case, the period is π, which means the function completes one full cycle every π units.
If we're talking about a sine or cosine function, this could be represented as:
y = 3sin(x/π) or y = 3cos(x/π)
Here, the '3' represents the amplitude and 'π' represents the period. The function will oscillate between -3 and 3, and will complete one full cycle every π units.
Similar Questions
Find the period and amplitude of the function.=y−3sinπxGive the exact values, not decimal approximations.
Find the amplitude, period and range of 𝑦=6sin(6𝑥+𝜋7)−3
Which of the following is a cosine equation having an amplitude of 2 and period of 6?Responsesy=2cos2x3𝑦=2cos2𝑥3y is equal to 2 cosine 2 x over 3y=2cos3πx2𝑦=2cos3𝜋𝑥2y=2cos3πx2𝑦=2cos3𝜋𝑥2y=2cosπx3𝑦=2cos𝜋𝑥3y=2cosπx3𝑦=2cos𝜋𝑥3y=2cos(3πx)
Complete the general form of the equation of a sinusoidal function having an amplitude of 4, a period of π, and a phase shift to the right 2 units.y =
Write a sine function that has an amplitude of 3, a midline of y, equals, 2y=2 and a period of start fraction, 8, pi, divided by, 7, end fraction 78π .
Upgrade your grade with Knowee
Get personalized homework help. Review tough concepts in more detail, or go deeper into your topic by exploring other relevant questions.