simply
12/18 = 2;3
15/25 = 3;5
32/40 = 4;5
6/14 = 3;7
8/15 = 8;15
9/12 = 3;4
12/27 = 4;9
9/12 = 3;4
Don't you simplify by finding an equivalent fraction?
12/18 = 2/3
yehh buhh is dis correct
Of the five words you just posted -- I only recognize two -- is, correct.
Yes, your answers are correct if you write them as fractions.
To interpret the given examples, it seems that for each fraction, the numbers on the left side of the division sign (numerator) and the numbers on the right side (denominator) are being expressed as separate whole numbers.
Let's take the first example: 12/18 = 2;3
To get this answer, you need to simplify the fraction by finding the greatest common divisor (GCD) of the numerator and the denominator.
The GCD of 12 and 18 is 6 (you can find this by listing common factors or using Euclid's algorithm).
To simplify the fraction, divide both the numerator and the denominator by the GCD.
12 divided by 6 equals 2, and 18 divided by 6 equals 3.
So, 12/18 simplifies to 2/3.
Similarly, for the other examples:
15/25 = 3;5 (GCD is 5): 15/25 simplifies to 3/5.
32/40 = 4;5 (GCD is 8): 32/40 simplifies to 4/5.
6/14 = 3;7 (GCD is 2): 6/14 simplifies to 3/7.
8/15 = 8;15 (GCD is 1): 8/15 remains the same.
9/12 = 3;4 (GCD is 3): 9/12 simplifies to 3/4.
12/27 = 4;9 (GCD is 3): 12/27 simplifies to 4/9.
9/12 = 3;4 (GCD is 3): 9/12 simplifies to 3/4 (duplicate).
To simplify fractions, always find the GCD of the numerator and denominator, and then divide both of them by the GCD.