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The Fourier series expansion of a sawtooth wave with a peak-to-peak amplitude of 5V and a frequency of 100 kHz can be represented as:

f(t)=52−5π∑n=1∞1nsin⁡(2πnft)f(t) = frac{5}{2} - frac{5}{pi}sum_{n=1}^{infty}frac{1}{n}sin(2pi n f t)

To determine the first four terms of this Fourier series expansion, we need to calculate the coefficients for n = 1, 2, 3, and 4. The coefficient for each term is given by:

an=2T∫0Tf(t)sin⁡(2πnft)dta_n = frac{2}{T}int_{0}^{T}f(t)sin(2pi n f t)dt

where T is the period of the sawtooth wave, which is given by T=1fT = frac{1}{f}

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