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The second derivative of the Inverse DCT
idct_accel(y, n = length(y))
A vector with the second derivative of the inverse DCT
DCT coefficients
The desired length of the idct
Returns the second derivative (acceleration) of the Inverse DCT (see dct for more details).
$$ \frac{\delta^2 x_j}{\delta j^2} = -2\left(\frac{\pi k}{J}\right)^2\sum_{k=1}^{N-1} y_k \cos\left(\frac{\pi k(2j+1)}{2J}\right) $$
x <- seq(0, 1, length = 10) y <- 5 + x + (2 * (x^2)) + (-2 * (x^4)) dct_coefs <- dct(y) y_accel <- idct_accel(dct_coefs) plot(y) plot(y_accel)
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