Which situation is best represented by the following equation? 40w+12.50=492.50 (1 point) Responses Nikayah paid $492.50 for ballet classes. She paid a $40 registration fee and $12.50 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes. Nikayah paid $492.50 for ballet classes. She paid a $40 registration fee and $12.50 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes. Nikayah paid $12.50 for ballet classes. She paid a $492.50 registration fee and $40 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes. Nikayah paid $12.50 for ballet classes. She paid a $492.50 registration fee and $40 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes. Nikayah paid $492.50 for ballet classes. She paid a $12.50 registration fee and $40 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes. Nikayah paid $492.50 for ballet classes. She paid a $12.50 registration fee and $40 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes. Nikayah paid $40 for ballet classes. She paid a $12.50 registration fee and $492.50 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes Nikayah paid $40 for ballet classes. She paid a $12.50 registration fee and $492.50 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes
The correct response is: Nikayah paid $492.50 for ballet classes. She paid a $40 registration fee and $12.50 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes.
The situation that is best represented by the equation 40w+12.50=492.50 is:
"Nikayah paid $492.50 for ballet classes. She paid a $40 registration fee and $12.50 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes."
Solve the equation for y. −1/5y+3=−7 (1 point) Responses 50 50 -35 -35 15 15 55
To solve the equation −1/5y+3=−7, we need to isolate the variable y.
First, subtract 3 from both sides of the equation:
−1/5y = −7 - 3
Simplifying, we get:
−1/5y = -10
Now, multiply both sides of the equation by -5 (the reciprocal of -1/5) to cancel out the fraction:
-5 * (-1/5y) = -5 * -10
y = 50
So the value of y that satisfies the equation is 50.
The situation best represented by the equation 40w + 12.50 = 492.50 is:
"Nikayah paid $492.50 for ballet classes. She paid a $40 registration fee and $12.50 for each week she was enrolled in the classes. Solve for w to find the number of weeks Nikayah was enrolled in ballet classes."
To solve for w, we need to isolate the variable w on one side of the equation. Here are the steps to solve the equation:
1. Start with the equation: 40w + 12.50 = 492.50
2. Subtract 12.50 from both sides of the equation to isolate the term with w: 40w = 492.50 - 12.50
This simplifies to: 40w = 480
3. Divide both sides of the equation by 40 to solve for w: w = 480 / 40
This simplifies to: w = 12
Therefore, Nikayah was enrolled in ballet classes for 12 weeks.