The correct equation to represent the situation is 92 + 16x = 104 + 13x.
To solve for x, we need to isolate the x term on one side of the equation. Subtracting 13x from both sides gives us:
92 + 16x - 13x = 104 + 13x - 13x
92 + 3x = 104
Next, we subtract 92 from both sides:
92 + 3x - 92 = 104 - 92
3x = 12
Finally, we divide both sides by 3 to solve for x:
3x/3 = 12/3
x = 4
Therefore, the two machines will have filled the same number of cans of soup after 4 minutes.
Two machines at a factory are filling cans of soup. One machine has filled 92 cans of soup. It fills cans at a rate of 16 cans per minute. The second machine has filled 104 cans of soup. It fills cans at a rate of 13 cans per minute. Write and solve an equation to show when the two machines will have filled the same number of cans of soup.(1 point) Responses 92+16x=104+13x ; x=4 92 plus 16 x equals 104 plus 13 x ; x equals 4 92+16x=104+13x ; x=6 92 plus 16 x equals 104 plus 13 x ; x equals 6 92−16x=104−13x ; x=−4 92 minus 16 x equals 104 minus 13 x ; x equals negative 4 104+16x=92+13x ; x=4
3 answers
92 + 16x - 13x = 104 + 13x - 13x
what another way to put this equation
what another way to put this equation
Another way to represent the equation is by simplifying both sides:
92 + 16x - 13x = 104 + 0
Combine like terms on both sides:
92 + 3x = 104
So, the equation can be written as 92 + 3x = 104.
92 + 16x - 13x = 104 + 0
Combine like terms on both sides:
92 + 3x = 104
So, the equation can be written as 92 + 3x = 104.