Derivatives of Constant Multiples

Example:
y = a*(x - b) (x - c) (x - d)

The first thing to notice when finding the derivative of this function is that it is the product of a constant and another function, as shown in color below:

y = a (x - b) (x - c) (x - d)

The Derivative Rule for Constant Multiples:

The derivative of a constant multiple is the constant times thederivative of the function.
If
  z = c ( f(x) )
then the derivative of z is
  z' = ( c f(x) )'
    = c f '(x)

So our example,

y = a (x - b) (x - c) (x - d)
we can think of as
y = c f(x)
So the derivative is
y ' = ( c f(x) )'
  = c f '(x)  
  = a ((x - b) (x - c) (x - d))'  
and we just need to know the derivative on the right-hand side of the equation. In this case this is
(x - b) (x - c) (x - d) = (1 - 0) (x - c) (x - d) + (x - b) (1 - 0) (x - d) + (x - b) (x - c) (1 - 0) (by the product rule, and the derivative rule for sums, derivative rule for sums (again), and derivative rule for sums (again))
so the finished derivative is
y ' = a ( (1 - 0) (x - c) (x - d) + (x - b) (1 - 0) (x - d) + (x - b) (x - c) (1 - 0) )
  = a*((x - c) (x - d) + (x - b) (x - d) + (x - b) (x - c))
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additional explanation for the derivative of constant multiples
see another derivative of constant multiples example
practice gateway test
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glarose@umich.edu
©2001 Gavin LaRose, University of Michigan Math Dept.