Q. Complex numbers are viewed in a plane called

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Q. Fourier transform of unit impulse at origin is

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Q. Continuous functions are sampled to form a

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Q. The common example of 2D interpolation is image

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Q. 2D Fourier transform and its inverse are infinitely

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Q. Aliasing as block like image components is called

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Q. Shrinking of image can be done using

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Q. Sum of many infinitely many periodic impulses is called

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Q. To reduce the effect of aliasing high frequencies are

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Q. If ƒ(x,y) is imaginary, then its Fourier transform is

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Q. The band limited function can be recovered from its samples if the acquired samples are at rate twice the highest frequency, this theorem is called

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Q. The product of two even or two odd functions is

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Q. Unit impulse at every point other than 0 is

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Q. The sum of cosines and sines coefficient multiplied is

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Q. Odd functions are said to be

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Q. A continuous band limited function can be recovered with no error if sampled intervals are less than 1/2umax is the statement of

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Q. The impulse S(t,v) is function having

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Q. Any function whose Fourier transform is zero for frequencies outside the finite interval is called

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Q. Fourier transform's domain is

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Q. Giving one period of the periodic convolution is called

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