Fundamental Applied Maths Solutions ❲HIGH-QUALITY SOLUTION❳

Dirichlet conditions hold (finite jumps, finite extrema).

For ( n=1 ): coefficient ( 2 ) → matches sawtooth wave. ✔ At ( t=\pi/2 ): series gives ( 2 - 1 + 2/3 - 1/2 + \dots = \pi/2 ) (Leibniz series). ✔

Best‑fit line ( y = a + bx ) in the least‑squares sense. fundamental applied maths solutions

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Ideal components, constant ( R, C, V_0 ). Dirichlet conditions hold (finite jumps, finite extrema)

Fourier series coefficients ( a_n, b_n ).

Residuals: ( 2.1 - (1.233+1.35)= -0.483 ); ( 3.9 - (1.233+2.70)= -0.033 ); ( 5.8 - (1.233+4.05)= 0.517 ). Sum of residuals ≈ 0 (rounding). ✔ ✔ Best‑fit line ( y = a +

On average, ( y ) increases by 1.35 units per unit increase in ( x ), with an intercept of 1.233. Example 3 – Fourier Series (Periodic Forcing) Given: ( f(t) = t ) for ( -\pi < t < \pi ), extended periodically with period ( 2\pi ).