Answer: [tex]7.5(10)^{14} Hz[/tex] and [tex]4.28(10)^{14} Hz[/tex]
Explanation:
The question in english is written below:
The eye is sensitive to electromagnetic waves whose wavelengths are approximately between [tex]4(10)^{-7}m[/tex] and [tex]7(10)^{-7}m[/tex]. What are the frequencies of these limit values knowing that the speed of light [tex]c=3(10)^{8} m/s[/tex]?
There is an inverse relationship between the frequency [tex]\nu[/tex] and the wavelength [tex]\lambda[/tex]:
[tex]\nu=\frac{c}{\lambda}[/tex] (1)
Where:
[tex]c=3(10)^{8} m/s[/tex] is the speed of light
[tex]\lambda[/tex] is the wavelength
Knowing this, we can find the frequency for the given wavelengths:
[tex]\nu=\frac{3(10)^{8} m/s}{4(10)^{-7}m}[/tex]
[tex]\nu=7.5(10)^{14}s^{-1}=7.5(10)^{14} Hz[/tex]
[tex]\nu=\frac{3(10)^{8} m/s}{7(10)^{-7}m}[/tex]
[tex]\nu=4.28(10)^{14}s^{-1}=4.28(10)^{14} Hz[/tex]
