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How do you find the derivative of # (pi/2)sinx-cosx#?

1 Answer

Jun 24, 2018

#dy/dx = (pi/2)cosx + sinx#

Explanation:

#y = (pi/2)sinx - cosx#

Since #pi/2# is a constant we can apply linearity for the derivative.

Hence, #dy/dx = (pi/2)d/dx(sinx) - d/dx(cosx)#

Applying standard derivatives

#dy/dx = (pi/2)cosx - (-sinx)#

#= (pi/2)cosx + sinx#

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