Final answer:
To find the wavelength of the second microwave generator emitting the longer wavelength, we can rearrange the formula Wavelength = wave speed / frequency and solve for the second frequency. Using the given values, the wavelength of the second generator is approximately 1.2875 cm.
Step-by-step explanation:
To find the wavelength of the microwave generator emitting the longer wavelength, we can use the formula:
Wavelength = wave speed / frequency
We are given the beat frequency (130 MHz) and the wavelength of the first generator (1.250 cm). The beat frequency is the difference between the frequencies of the two generators:
Beat frequency = frequency2 - frequency1
We can rearrange the formula to solve for the second frequency:
Frequency2 = beat frequency + frequency1
Using the given values, we get:
Frequency2 = 130 MHz + 900 MHz = 1030 MHz
Now we can use the formula for wavelength, using the second frequency:
Wavelength2 = wave speed / frequency2
Substituting the known values:
Wave speed = wavelength2 * frequency2 = 1.250 cm * 1030 MHz
Calculating the wave speed:
Wave speed = 1.250 cm * 1030 MHz = 1.2875 cm
Therefore, the wavelength of the second microwave generator emitting the longer wavelength is approximately 1.2875 cm.