If a number $a$ is divisible by $b$ , then it must be divisible by each factor of $b$ . State whether the statement given is true or false

True

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False

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Solution

The correct option is A True
Prove divisibility for the given factors
Let $c, d$ be two factors of $b$
If $a$ is divisible by $b$ then it implies that $b$ is a factor of $a$
If $b$ is a factor of $a$ , then $c, d$ both are factors of $a$ too.
This implies that $a$ is divisible by both $c$ and $d$ .
Hence, the given statement is True.

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If a number a is divisible by b, then it must be divisible by each factor of b. State whether the statement given is true or false

The correct option is A TrueProve divisibility for the given factorsLet c,d be two factors of bIf a is divisible by b then it implies that b is a factor of aIf b is a factor of a, then c,d both are factors of a too.This implies that a is divisible by both c and d.Hence, the given statement is True.

If a number $a$ is divisible by $b$ , then it must be divisible by each factor of $b$ . State whether the statement given is true or false