Two waves are traveling in the same direction along a stretched string. The waves are 45.0° out of phase. Each wave has an amplitude of 9.00 cm. Find the amplitude of the resultant wave.

If two identical waves are traveling in the same direction, with the same frequency, wavelength and amplitude; BUT differ in phase the waves add together.

A = 9cm (amplitude)

φ = 45 (phase angle)

The two waves are y1 and y2

y = y1 + y2

where y1 = 9 sin (kx - ωt)

and y2 = 9 sin (kx - ωt + 45)

y = 9 sin(kx - ωt) + 9 sin(kx - ωt + 45) = 9 sin (a) + 9 sin (b)

where a = (kx - ωt)

abd b = (kx - ωt + 45)

Apply trig identity: sin a + sin b = 2 cos((a-b)/2) sin((a+b)/2)

A sin ( a ) + A sin ( b ) = 2A cos((a-b)/2) sin((a+b)/2)

We have that

9 sin ( a ) + 9 sin ( b ) = 2(9) cos((a-b)/2) sin((a+b)/2)

= 2(9) cos[(kx - wt -(kx - wt + 45))/2] sin[(kx - wt +(kx -wt +45)/2]

y = 2(9) cos (φ /2) sin (kx - ωt + 45/2)

The resultant sinusoidal wave has the same frequency and wavelength as the original waves, but the amplitude has changed:

Amplitude equals 2(9) cos (45/2) = 18 cos (22.5°) = 18 * -0.87330464009

= -15.7194835217 cm ≅ 15.72 cm

since amplitudes cannot be negative our answer is 15.72 cm