The base case is the claim that
which reduces to
which is true.
Assume that the inequality holds for <em>n</em> = <em>k </em>; that
We want to show if this is true, then the equality also holds for <em>n</em> = <em>k</em> + 1 ; that
By the induction hypothesis,
Now compare this to the upper bound we seek:
because
in turn because
Positive correlation, likely causal
Answer is A
Step-by-step explanation:
Answer:
D
Step-by-step explanation:
times all the numbers together
Answer:
-35c+40d
Step-by-step explanation:
distribute -8 through the numbers in the parenthesis by distribute I mean multiply the numbers in the parenthesis by -8
combine the like terms (c)
combine like terms(d)
then you have your answer
It important to do quadratics because it is used to find the curve objects when they fly through the air
