Your friend finds 192 divided by 6 by writing (6 x 30) + (6 x 2). She says the answer is 12. Is your friend correct? EXPLAIN!
The Correct Answer and Explanation is:
No, your friend is not correct. Let me explain why.
The expression your friend wrote, (6 × 30) + (6 × 2), seems to be an attempt to break down the division into smaller parts. However, this method does not lead to the correct answer for 192 ÷ 6.
Let’s break down the division properly:
192 ÷ 6 is the same as asking “how many times does 6 go into 192?”
To solve this, you can either directly divide 192 by 6 or use long division. Doing the division:
192 ÷ 6 = 32.
Now, let’s check your friend’s approach:
She wrote (6 × 30) + (6 × 2). Let’s simplify that:
- 6 × 30 = 180
- 6 × 2 = 12
- So, (6 × 30) + (6 × 2) = 180 + 12 = 192.
While 192 is correct, this expression does not represent a division. Instead, it’s just a way to break down 192 into two parts, both of which are multiples of 6. However, this does not solve for the number of times 6 fits into 192.
To sum up, the correct answer is 32, not 12, and the method your friend used is not the correct way to perform division
