Which of the given pairs rational numbers is/ are equivalent? -20/24,-80/96
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Solution:
-20/24 and -80/96
Equivalent fractions (rational numbers) have different numerators and denominators, but their fractional values are the same.
To check if they are equivalent rational numbers use cross multiply method.
-20/24 = -80/96
-20 * 96 = 24 * -80
- 1920 = - 1920
Therefore, they are equivalent rational numbers.
These are just some equivalent of -20/24 and -80/92
= -5/6
= -10/12
= -15/18
= -20/24
= -25/30
= -30/36
= -35/42
= -40/48
= -45/54
= -50/60
= -55/66
= -60/72
= -65/78
= -70/84
= -75/90
= -80/96
= -85/102
= -90/108
= -95/114
= -100/120
= -105/126
= -110/132
= -115/138
= -120/144
Hope this will help
-20/24 and -80/96
Equivalent fractions (rational numbers) have different numerators and denominators, but their fractional values are the same.
To check if they are equivalent rational numbers use cross multiply method.
-20/24 = -80/96
-20 * 96 = 24 * -80
- 1920 = - 1920
Therefore, they are equivalent rational numbers.
These are just some equivalent of -20/24 and -80/92
= -5/6
= -10/12
= -15/18
= -20/24
= -25/30
= -30/36
= -35/42
= -40/48
= -45/54
= -50/60
= -55/66
= -60/72
= -65/78
= -70/84
= -75/90
= -80/96
= -85/102
= -90/108
= -95/114
= -100/120
= -105/126
= -110/132
= -115/138
= -120/144
Hope this will help
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