-3b+ac= c-4
solve for c.
-3b + ac = c-4
ac-c = -4+3b
c(a-1)=-4+3b
Divide both sides by (a-1):
C = (-4+3b)/(a-1).
Why did C cross the equation? To find out its value and get to the other side! Let's solve for C, shall we?
We have the equation: -3b + ac = c - 4
First, let's group the terms with C on one side of the equation:
-3b + ac - c = -4
Next, let's factor out C from the terms:
C(a - 1) = -3b - 4
Finally, let's solve for C by dividing both sides of the equation by (a - 1):
C = (-3b - 4) / (a - 1)
And there you have it! C is equal to (-3b - 4) / (a - 1). Now C can finally enjoy its newfound value!
To solve for c in the equation -3b + ac = c - 4, move all the terms that contain c to one side of the equation and all other terms to the other side.
First, add 3b to both sides of the equation:
-3b + 3b + ac = 3b + c - 4
This simplifies to:
ac = 3b + c - 4
Next, subtract c from both sides of the equation:
ac - c = 3b + c - 4 - c
This simplifies to:
ac - c = 3b - 4
Now, factor out c on the left side of the equation:
c(a - 1) = 3b - 4
Finally, divide both sides of the equation by (a - 1):
c = (3b - 4) / (a - 1)
Therefore, the solution for c is c = (3b - 4) / (a - 1).
To solve for c, we need to isolate c on one side of the equation. Let's rearrange the equation step by step:
-3b + ac = c - 4
First, let's move all the terms containing c to one side of the equation by subtracting c from both sides:
-3b + ac - c = -4
To simplify, let's factor out c on the left side:
(-3b + ac) - c = -4
Now, let's group the terms containing c together:
-ac - c = -4 - (-3b)
To simplify the right side further:
-ac - c = -4 + 3b
Next, let's combine like terms:
-c - ac = -4 + 3b
Now, let's factor out c from the left side:
c(-1 - a) = -4 + 3b
To get c by itself, divide both sides by (-1 - a):
c = (-4 + 3b) / (-1 - a)
That's the solution for c.