f=x'y+xyz’ find f'
Solution
To find f', we need to differentiate the given expression f with respect to each variable.
Step 1: Differentiate the first term, x'y, with respect to x. The derivative of x'y with respect to x is y.
Step 2: Differentiate the second term, xyz', with respect to x. The derivative of xyz' with respect to x is yz'.
Step 3: Combine the derivatives from step 1 and step 2. f' = y + yz'
Therefore, the derivative of f = x'y + xyz' with respect to x is f' = y + yz'.
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