The next review is probably the most important one of all. We cannot forget how to do the product and quotient rule!
Both of these rules include a formula.
here is the formula for the product rule:
(recopy the first equation)(take the derivative of the second equation)+(recopy the second equation)(take the derivative of the first equation)
here is a example where you would have to
apply this rule:
(3x-2x^2)(5+4x)
since these two equations are being
multiplied you have to use the product
rule and plug in the formula
After doing so this is what you end up with
(3x-2x^2)(4)+(5+4x)(3-4x)
then you simplify as much as
you can
12x-8x^2+15-20x+12x-16x^2
=-32x^2+4x+15
next is the quotient rule
here is the formula:
(bottom)(derivative of top)-[(top)(derivative of bottom)]/ (bottom)^2
the only way that this rule would not apply is if
you have a number instead of an equation
at the bottom of the fraction.
anyway here is an example using
the quotient rule:
5x^2-2/x^2+1
(x^2+1)(5)-[(5x-2)(2x)/(x^2+1)^2
from here, once again, you just
simplify as much as possible
5x^2+5-[10x^2-4x]/(x^2+1)^2
always keep the bottom of the problem
as is.
5x^2+5-10x^2+4/(x^2+1)^2
=-5x^2+4x+5/(x^2+1)
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