Science

Math

Humanities

... and beyond

Socratic Meta
Featured Answers

Topics

How do you write a cosine equation with max= 21, min= 15 and period=15?

1 Answer

A. S. Adikesavan

Jul 25, 2016

$x = B + 3 cos (\frac{2 π}{15} t + E)$ $x= B + 3 cos ( (2pi)/15 t + E)$ , where B and E are arbitrary constants.

Explanation:

The general form of cosine wave with axis parallel to t-axis, axis about which it oscillates x = B, amplitude A, period P and epoch (shift) E is

$x - B + A cos ((\frac{2 π}{P}) t + E)$ $x - B + A cos (( (2pi)/P)t + E)$ .

Here 2 A = maximum x - minimum x $= 21 - 15 = 6$ $= 21-15=6$ . So, A = 3.

The period $\frac{2 π}{P} = 15$ $(2pi)/P= 15$ . So, $P = \frac{2 π}{15}$ $P=(2pi)/15$ ..

Thus, this coscine oscillation is given by

$x = B + 3 cos (\frac{2 π}{15} t + E)$ $x = B + 3 cos ((2pi)/15 t + E )$ , where B and E are at your choice.

Related questions

See all questions in Translating Sine and Cosine Functions

Impact of this question

2009 views around the world

You can reuse this answer
Creative Commons License