Answer:
a) 1.95 m/s
b) 5.56 m
Explanation:
Given that:
Velocity of the skier [tex](V_s)[/tex] = 14.3 m/s
For the skier moving in the direction of the wave, we have:
Period (T) = 0.450 s
Relative velocity (V) of the skier in regard with the wave = [tex](V_s - V_w)[/tex]
where:
[tex]V_s[/tex] = velocity of the skier
[tex]V_w[/tex] = velocity of the wave
The wavelength [tex](\lambda)[/tex] can be written as:
[tex]\lambda = (V_s-V_w)T[/tex]
[tex]\lambda = (V_s-V_w) 0.450m[/tex] ---------------> Equation (1)
For the skier moving opposite in the direction of the wave, we have:
Period (T) = 0.342 s
Relative velocity (V) of the skier in regard with the wave = [tex](V_s + V_w)[/tex]
The wavelength [tex](\lambda)[/tex] can be written as:
[tex]\lambda = (V_s+V_w)T[/tex]
[tex]\lambda = (V_s+V_w) 0.342m[/tex] ------------------> Equation 2
Equating equation (1) and equation (2) and substituting [tex]V_s[/tex] = 14.3 m/s ; we have:
[tex](V_s-V_w) 0.450m = (V_s-V_w) 0.342m[/tex]
[tex]0.450m(V_s)-0.450m(V_w) = 0.342m(V_s)+0.342m(V_w)[/tex]
Collecting the like terms; we have:
[tex]0.450m(V_s) - 0.342m(V_s) = 0.342m(V_w)+0.450m(V_w)[/tex]
[tex](V_s)(0.450m - 0.342m) = (V_w)0.342m+0.450m[/tex]
[tex]14.3m/s(0.450m - 0.342m) = (V_w)0.342m+0.450m[/tex]
[tex]14.3m/s(0.108m = (V_w)0.792m[/tex]
[tex]1.5444m^2/s = (V_w)0.792m[/tex]
[tex](V_w) = \frac{1.5444m^2/s}{ 0.792m}[/tex]
[tex](V_w) = 1.95 m/s[/tex]
b)
The Wavelength of the wave can be calculated using : [tex]( \lambda }) = (V_s-V_w) 0.450m[/tex]
[tex]({\lambda}) = (14.3 m/s -1.95 m/s)(0.450)[/tex]
[tex](\lambda) = (12.35)0.450m[/tex]
[tex](\lambda)= 5.5575 m[/tex]
λ ≅ 5.56 m
