Constant factor rule in integration
- Constant factor rule in integration
-
The constant factor rule in integration is a dual of the constant factor rule in differentiation, and is a consequence of the linearity of integration. It states that a constant factor within an integrand can be separated from the integrand and instead multiplied by the integral. For example, where k is a constant:
Proof
Start by noticing that, from the definition of integration as the inverse process of differentiation:
Now multiply both sides by a constant k. Since k is a constant it is not dependent on x:
Take the constant factor rule in differentiation:
Integrate with respect to x:
Now from (1) and (2) we have:
Therefore:
Now make a new differentiable function:
Substitute in (3):
Now we can re-substitute y for something different from what it was originally:
So:
This is the constant factor rule in integration.
A special case of this, with k=-1, yields:
Categories:
- Integral calculus
- Mathematics stubs
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