For the Fourier series of the following function of period \( 2\pi \):
The ratio (to the nearest integer) of the Fourier coefficients of the first and the third harmonic is:
For the Fourier series of the following function of period \( 2\pi \):
The ratio (to the nearest integer) of the Fourier coefficients of the first and the third harmonic is:
Show Hint
- 1
- 2
- 3
- 6
The Correct Option is D
Solution and Explanation
The Fourier series of a function \( f(x) \) is given by the sum of sines and cosines of integer multiples of the fundamental frequency. The first and third Fourier coefficients correspond to the fundamental frequency and its third harmonic, respectively. By calculating the Fourier coefficients, we find the ratio of the first and third coefficients to be 6.
Step 2: Conclusion.
Thus, the correct answer is option (D), with the ratio being 6.
Top Questions on Physics
- Arrange the following in increasing order of their wavelength.
A. gamma radiations
B. X rays
C. UV radiations
D. microwave
E. Infrared radiations - Kinematics deal with the
- A jet engine works on the principle of conservation of:
- From the Hall Effect experiment, one can measure:
- Bragg's law of diffraction is used to determine the:
Questions Asked in IIT JAM exam
- The shortest distance between an object and its real image formed by a thin convex lens of focal length 20 cm is _____ cm. (in integer)
- If \(\left(\frac{1-i}{1+i}\right)^{n/2} = -1\), where \(i = \sqrt{-1}\), one possible value of n is
- IIT JAM PH - 2025
- Complex numbers
- In a two-level atomic system, the excited state is 0.2 eV above the ground state. Considering the Maxwell-Boltzmann distribution, the temperature at which 2% of the atoms will be in the excited state is _____ K. (up to two decimal places)
(Boltzmann constant \(k_B = 8.62 \times 10^{-5}\) eV/K)
- IIT JAM PH - 2025
- Mechanics
At a particular temperature T, Planck's energy density of black body radiation in terms of frequency is \(\rho_T(\nu) = 8 \times 10^{-18} \text{ J/m}^3 \text{ Hz}^{-1}\) at \(\nu = 3 \times 10^{14}\) Hz. Then Planck's energy density \(\rho_T(\lambda)\) at the corresponding wavelength (\(\lambda\)) has the value \rule{1cm}{0.15mm} \(\times 10^2 \text{ J/m}^4\). (in integer)
[Speed of light \(c = 3 \times 10^8\) m/s]
(Note: The unit for \(\rho_T(\nu)\) in the original problem was given as J/m³, which is dimensionally incorrect for a spectral density. The correct unit J/(m³·Hz) or J·s/m³ is used here for the solution.)- IIT JAM PH - 2025
- Mechanics
- The ratio of the density of atoms between the (111) and (110) planes in a simple cubic (sc) lattice is ____. (up to two decimal places)
- IIT JAM PH - 2025
- Solid State Physics, Devices, Electronics