## The integer $$120$$ has many factorizations. For example, $$120=(2)(60), 120=(3)(4)(10),$$ and $$120=(-1)(-3)(4)(10).$$

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### The integer $$120$$ has many factorizations. For example, $$120=(2)(60), 120=(3)(4)(10),$$ and $$120=(-1)(-3)(4)(10).$$

by VJesus12 » Thu Sep 16, 2021 11:36 am

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The integer $$120$$ has many factorizations. For example, $$120=(2)(60), 120=(3)(4)(10),$$ and $$120=(-1)(-3)(4)(10).$$ In how many of the factorizations of $$120$$ are the factors consecutive integers in ascending order?

A. 2
B. 3
C. 4
D. 5
E. 6