SOLUTION: if f is a function such that for all integer m and n, f(m, 1) =m+1 and F(m, n) = F(m+2, n-3) then F(84967) equals (f is different from F)
a)727
b)728
c)729
d)324
e)323
Algebra.Com
Question 1123666: if f is a function such that for all integer m and n, f(m, 1) =m+1 and F(m, n) = F(m+2, n-3) then F(84967) equals (f is different from F)
a)727
b)728
c)729
d)324
e)323
Found 2 solutions by ikleyn, greenestamps:
Answer by ikleyn(52802) (Show Source): You can put this solution on YOUR website!
.
This post, as it is presented, MAKES NO SENSE.
============================
Hey, in one hour I counted at least 4 nonsensical posts, submitted to this forum.
My impression is that the person on the opposite end of the Internet
does not understand any single sound in Math.
I ask the managers to replace this person IMMEDIATELY
for his total inability to formulate Math problems correctly.
Answer by greenestamps(13200) (Show Source): You can put this solution on YOUR website!
By your definition, F is a function that takes 2 inputs. So F(84967) is undefined....
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