ys + yz = t
This equation represents a linear relationship between the variables ys, yz, and t. It can be interpreted as the sum of ys and yz equals t.
To solve the equation ys + yz = t, we can factor out the common variable y:
y(s + z) = t
Now, divide both sides of the equation by (s + z):
y = t / (s + z)
So, the equation can be solved for y by dividing t by the sum of s and z.
The given equation is ys + yz = t. It seems to be a linear equation with two variables, y and s, and t as a constant.
To solve this equation, we need to isolate one variable in terms of the other variable and the constant. Let's solve for y in terms of s and t.
Step 1: Factor out y from the terms on the left side of the equation:
y(s + z) = t
Step 2: Divide both sides of the equation by (s + z) to isolate y:
y = t / (s + z)
So the solution to the equation ys + yz = t is y = t / (s + z).