An employee’s hourly earnings is described at 10y=80x. What is the employee’s earning per hour?
, the employee's earning per hour is y/8.
To find the employee's earning per hour, we need to isolate y in the equation.
10y = 80x
Divide both sides by 10:
y = 8x
Now, we can see that the employee's earning per hour is y/8, since 8x represents the number of hours worked.
To find the employee's earning per hour, we need to rearrange the given equation.
The equation 10y = 80x can be rewritten as y = 8x.
Now we can see that the employee's earning per hour is y/8.
So, the employee's earning per hour is simply x.
To find the employee's earning per hour, we need to solve the given equation. Here's how you can do it:
1. Start with the given equation: 10y = 80x
2. Divide both sides of the equation by 10 to isolate y: (10y)/10 = (80x)/10
This simplifies to: y = 8x
3. The equation y = 8x represents the relationship between the employee's hourly earnings (y) and the number of hours worked (x).
4. Now, to find the employee's earning per hour, we need to express y in terms of x.
Divide both sides of the equation by x: y/x = 8x/x
This simplifies to: y/x = 8
5. Rearrange the equation to solve for y per hour:
Multiply both sides of the equation by x: (y/x) * x = 8x
Simplify: y = 8x
6. From the equation y = 8x, we can conclude that the employee's earning per hour is given by y/8.
Therefore, the employee's earning per hour is y/8.