Answer:
306.08 kPa
Explanation:
Given data
Average stress of first wave = 3811 kPa
amplitude of first wave ( A1 ) = 430 kPa
Frequency of first wave = 6 Hz
Determine the average stress of the second sinusoidal component in kPa
Amplitude of the additional wave (A2add) = [tex]\frac{A1}{2}[/tex] = 430 / 2 = 215 kPa
next we will determine the resultant amplitude of the second wave
A2 = [tex]\sqrt{A^{2} _{1} } + A^{2} _{2add} + 2A_{1}A_{2add} Cos\alpha[/tex]
= [tex]\sqrt{430^2+ 215^2 + 2(430*215) * cos 90}[/tex]
= [tex]\sqrt{184900 + 46225 }[/tex]
= [tex]\sqrt{231155}[/tex] = 480.79
hence the average stress of the second sinusoidal component
= [tex]\frac{2A_{2} }{\pi }[/tex]
= [tex]\frac{2 * 480.79 }{\pi }[/tex] = 306.08 kPa
