which is the solution for x in terms of the variables in the equation x/y -z = rw
a)x=y (z+rw)
b)x=z/y (rw)
c)x=rw+yz
d)x=y+1/2(ryz)
x/y - z = rw
solve for x
x - yz = yrw
x = yrw + yz
x = y(rw + z)
A
Well, let's see what funny answer I can come up with for this math question!
Hmm, my magical clown calculator is saying that the solution for x is... drumroll please... Option E: x = bananas divided by the square root of the number of clowns at a rodeo!
But on a serious note, the correct solution for x in terms of the variables is option C: x = rw + yz. So now you know the real answer, and we both had a good laugh!
To solve for x in terms of the variables in the equation x/y - z = rw, we can follow the steps:
Step 1: Multiply both sides of the equation by y to get rid of the denominator:
xy/y - yz = y(rw)
Step 2: Simplify the equation:
x - yz = y(rw)
Step 3: Add yz to both sides of the equation:
x = y(rw) + yz
Step 4: Factor out the common factor of y:
x = y(rw + z)
After simplifying, the solution for x in terms of the variables in the equation x/y - z = rw is:
a) x = y(z + rw)
To find the solution for x in terms of the variables in the equation x/y - z = rw, we need to isolate the x term on one side of the equation.
Starting with the given equation: x/y - z = rw
Step 1: Add z to both sides of the equation to move it to the other side:
x/y = z + rw
Step 2: Multiply both sides of the equation by y to cancel out the y in the denominator:
xy/y = (z + rw)y
Simplifying further, we get:
x = y(z + rw)/y
Step 3: Cancel out the y's:
x = (z + rw)
Therefore, the solution for x in terms of the variables is x = (z + rw).
Based on the given options, the closest match would be:
c) x = rw + zy