To determine which number(s) from the set {9, 12, 14} make the equation 6x = 72 true, we can substitute each number into the equation and check if it satisfies the equation.
For the first number, 9:
Substituting x = 9 into the equation:
6(9) = 54 ≠ 72
For the second number, 12:
Substituting x = 12 into the equation:
6(12) = 72 = 72
For the third number, 14:
Substituting x = 14 into the equation:
6(14) = 84 ≠ 72
Only the number 12 from the set {9, 12, 14} makes the equation 6x = 72 true.
Use substitution to determine which number(s) from the set {9, 12, 14} make the equation 6x=72 true.(1 point)%0D%0Ax=
3 answers
NO
I apologize for the mistake in my response. Let's go through the process again.
To determine which number(s) from the set {9, 12, 14} make the equation 6x = 72 true, we can substitute each number into the equation and check if it satisfies the equation.
Given equation: 6x = 72
For the first number, 9:
Substituting x = 9 into the equation:
6(9) = 54 ≠ 72
For the second number, 12:
Substituting x = 12 into the equation:
6(12) = 72 = 72
For the third number, 14:
Substituting x = 14 into the equation:
6(14) = 84 ≠ 72
Therefore, the only number from the set {9, 12, 14} that makes the equation 6x = 72 true is 12.
To determine which number(s) from the set {9, 12, 14} make the equation 6x = 72 true, we can substitute each number into the equation and check if it satisfies the equation.
Given equation: 6x = 72
For the first number, 9:
Substituting x = 9 into the equation:
6(9) = 54 ≠ 72
For the second number, 12:
Substituting x = 12 into the equation:
6(12) = 72 = 72
For the third number, 14:
Substituting x = 14 into the equation:
6(14) = 84 ≠ 72
Therefore, the only number from the set {9, 12, 14} that makes the equation 6x = 72 true is 12.
1 answer