I went through how DCT (discrete cosine transform) is used in image and video compression standards.
But why DCT only is preferred over other transforms like dft or dst?
I went through how DCT (discrete cosine transform) is used in image and video compression standards. But why DCT only is preferred over other transforms like dft or dst? 


Because
The DCT just happens to suit. That is really all there is to it. 


The DCT of a image macroblock where the top and bottom and/or the left and right edges don't match will have less energy in the higher frequency coefficients than a DFT. Thus allowing greater opportunities for these high coefficients to be removed, more coarsely quantized or compressed, without creating more visible macroblock boundary artifacts. 


When performing image compression, our best bet is to perform the KLT or the Karhunen–Loève transform as it results in the least possible mean square error between the original and the compressed image. However, KLT is dependent on the input image, which makes the compression process impractical. DCT is the closest approximation to the KL Transform. Mostly we are interested in low frequency signals so only even component is necessary hence its computationally feasible to compute only DCT. Also, the use of cosines rather than sine functions is critical for compression as fewer cosine functions are needed to approximate a typical signal (See Douglas Bagnall's answer for further explanation). Another advantage of using cosines is the lack of discontinuities. In DFT, since the signal is represented periodically, when truncating representation coefficients, the signal will tend to "lose its form". In DCT, however, due to the continuous periodic structure, the signal can withstand relatively more coefficient truncation but still keep the desired shape. 

