Why is the division of two fractions the same even if you change the numerator and denominator of the dividing number and calculate it as a product?
Why is the division of two fractions the same even if you change the numerator and denominator of the dividing number and calculate it as a product?
You really don't know?
Ah, fraction division is basically multiplying the reciprocal. So if you switch the numerator and denominator and multiply, you get the same result as the original value, so it can be said to be the principle of reciprocal multiplication. (≧▽≦)
Do you know why?
Well, fraction division is multiplying the reciprocal. When two fractions switch positions and then multiply, they become the same as the original value. When you multiply the original fraction and the reciprocal, the numerator and denominator cancel each other out and become 1. So in the end, you get the same value.
I thought you didn’t know haha
It's okay if you don't know. I'll explain it briefly. Division of fractions is based on the same principle as multiplying the reciprocal. When dividing a fraction, you just change the numerator and denominator of the dividing number and multiply it. So the result will be the same. If you study hard, you will do well. Fighting. nyan~~ (^_^)