if the trough (lowest point) of a wave can be expressed as a negative number, but the crest (highest point)…

if the trough (lowest point) of a wave can be expressed as a negative number, but the crest (highest point) is positive, then the distance between the two must be an absolute value for a normal balanced wave expressing a symmetric form. therefore, the relationship could be expressed as (d =| 2p|) where (d) is distance from the trough to the crest while (p) is the distance of either the trough or the crest from the middle or equilibrium point. manipulating the formula further could lead to (p=\frac{d}{2}) find (p) when (d = 14) (you do not need to include the units. only enter the number value for an answer.)

if the trough (lowest point) of a wave can be expressed as a negative number, but the crest (highest point) is positive, then the distance between the two must be an absolute value for a normal balanced wave expressing a symmetric form. therefore, the relationship could be expressed as (d =| 2p|) where (d) is distance from the trough to the crest while (p) is the distance of either the trough or the crest from the middle or equilibrium point. manipulating the formula further could lead to (p=\frac{d}{2}) find (p) when (d = 14) (you do not need to include the units. only enter the number value for an answer.)

Answer

Explanation:

Step1: Identify the formula

We are given the formula $p=\frac{d}{2}$.

Step2: Substitute the value of d

Substitute $d = 14$ into the formula: $p=\frac{14}{2}$.

Step3: Calculate the value of p

$p = 7$.

Answer:

7