Solve the equation by the zero-factor property.
(s−36)(s+25)=0
To use the zero-factor property, we set each factor equal to zero and solve for s.
Setting s - 36 = 0, we add 36 to both sides: s = 36.
Setting s + 25 = 0, we subtract 25 from both sides: s = -25.
So the solutions to the equation are s = 36 and s = -25.
To solve the equation (s-36)(s+25) = 0 using the zero-factor property, we set each factor equal to zero and solve for s.
Step 1: Set the first factor, s-36, equal to zero:
s - 36 = 0
Step 2: Solve for s:
s = 36
Step 3: Set the second factor, s+25, equal to zero:
s + 25 = 0
Step 4: Solve for s:
s = -25
Therefore, the solutions to the equation (s-36)(s+25) = 0 are s = 36 and s = -25.
To solve the equation (s-36)(s+25) = 0 using the zero-factor property, we need to set each factor equal to zero and solve for s.
First, let's set the first factor, s-36, equal to zero:
s - 36 = 0
To isolate s, we can add 36 to both sides of the equation:
s = 36
Now, let's set the second factor, s+25, equal to zero:
s + 25 = 0
To isolate s, we can subtract 25 from both sides of the equation:
s = -25
Therefore, the solutions to the equation (s-36)(s+25) = 0 are s = 36 and s = -25.