Question
the general expression for consecutive multiples of 6 is 6N, 6(N + 1), 6(N +2), etc. find three consecutive multiples of 6 such that 4 times the first exceeds twice the third by 12.
Let N be the first, so n+1 is next, etc.
4(6(n+1))-2(6(n+3))=12
so, find n, then 6(n+1) for the first, 6(n+2) for the second, and 6(n+3) for the third.
i don't understand what you mean by that
What's some things I'll need for this class?
Let N be the first, so n+1 is next, etc.
4(6(n+1))-2(6(n+3))=12
so, find n, then 6(n+1) for the first, 6(n+2) for the second, and 6(n+3) for the third.
i don't understand what you mean by that
What's some things I'll need for this class?
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