dannybueno230
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WILL REWARD BRAINLIEST

Test the conditional statement and it’s converse to determine whether the following biconditional is true.

A number is divisible by 10 if and only it is divisible by 5

A) It is false because at least one part of the biconditional is false

B) It is true because both parts of the biconditional are true

C) It is true because at least one part from the biconditional is true

D) It is false because both parts of the biconditional are true

Respuesta :

Answer:

Option A. is the correct option.

Step-by-step explanation:

If a number is divisible by 5 it is not necessary that the number will be divisible by 10.

For example: 25 is the number divisible by 5 but not divisible by 10.

Or in other words a number divisible by 5 should be even to be divisible by 10.

So for the conditional statement : A number is divisible by 10 if and only if it is divisible by 5 will be false because any one out of these two statements is false. We know biconditional is true only when both the statements are true or false means both the statements should have same truth value.

Therefore Option A. is the correct option.


david8644

Answer:

A) It is false because at least one part of the biconditional is false

Step-by-step explanation:

It is false, because one part of the biconditional is false, this is because it is the case that there are numbers that are divisible by 5 but are not divisible by ten, this means that the conditional part is false, half of the number that are devisible by 5 are divisible by ten but not al of them. A biconditional is what is called in math when you you the stateme "If and only if".

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