what is Beejal is solving the equation y/7 − 3 = 39 .(1 point)
As a first step, he starts by adding
to both sides of the equation, and then continues by multiplying by
on each side.
To solve the equation y/7 - 3 = 39, Beejal first starts by adding 3 to both sides of the equation. This is to get rid of the -3 on the left side of the equation.
By adding 3 to both sides, the equation becomes:
y/7 - 3 + 3 = 39 + 3
Simplifying the left side:
y/7 = 42
Now, Beejal wants to isolate the variable y, so he multiplies both sides of the equation by 7. This is done to cancel out the division by 7 on the left side of the equation.
By multiplying both sides by 7, the equation becomes:
7 * (y/7) = 7 * 42
Simplifying the left side:
y = 294
Therefore, the value of y that solves the equation is 294.
Beejal is solving the equation y/7 − 3 = 39.
As a first step, he starts by adding 3 to both sides of the equation. This is done to isolate the variable term, which in this case is y/7. By adding 3 to both sides, the equation becomes:
y/7 = 42
Next, Beejal multiplies by 7 on each side of the equation. This is done to eliminate the denominator and solve for the variable y. By multiplying by 7 on both sides, the equation becomes:
7 * (y/7) = 7 * 42
y = 294
So, Beejal has solved the equation y/7 − 3 = 39 and found that the value of y is 294.
To solve the equation y/7 - 3 = 39, Beejal starts by adding 3 to both sides of the equation. This is done to isolate the variable and remove the constant term on the left side. Adding 3 to both sides gives:
y/7 - 3 + 3 = 39 + 3
y/7 = 42
Next, Beejal multiplies both sides of the equation by 7. This is done to eliminate the denominator and solve for the variable y. Multiplying by 7 gives:
7 * (y/7) = 42 * 7
y = 294
Therefore, the solution to the equation y/7 - 3 = 39 is y = 294.