8y+3(y-6)=4(y+1)-2

Simple and best practice solution for 8y+3(y-6)=4(y+1)-2 equation. Check how easy it is, and learn it for the future. Our solution is simple, and easy to understand, so don`t hesitate to use it as a solution of your homework.

If it's not what You are looking for type in the equation solver your own equation and let us solve it.

Solution for 8y+3(y-6)=4(y+1)-2 equation:


Simplifying
8y + 3(y + -6) = 4(y + 1) + -2

Reorder the terms:
8y + 3(-6 + y) = 4(y + 1) + -2
8y + (-6 * 3 + y * 3) = 4(y + 1) + -2
8y + (-18 + 3y) = 4(y + 1) + -2

Reorder the terms:
-18 + 8y + 3y = 4(y + 1) + -2

Combine like terms: 8y + 3y = 11y
-18 + 11y = 4(y + 1) + -2

Reorder the terms:
-18 + 11y = 4(1 + y) + -2
-18 + 11y = (1 * 4 + y * 4) + -2
-18 + 11y = (4 + 4y) + -2

Reorder the terms:
-18 + 11y = 4 + -2 + 4y

Combine like terms: 4 + -2 = 2
-18 + 11y = 2 + 4y

Solving
-18 + 11y = 2 + 4y

Solving for variable 'y'.

Move all terms containing y to the left, all other terms to the right.

Add '-4y' to each side of the equation.
-18 + 11y + -4y = 2 + 4y + -4y

Combine like terms: 11y + -4y = 7y
-18 + 7y = 2 + 4y + -4y

Combine like terms: 4y + -4y = 0
-18 + 7y = 2 + 0
-18 + 7y = 2

Add '18' to each side of the equation.
-18 + 18 + 7y = 2 + 18

Combine like terms: -18 + 18 = 0
0 + 7y = 2 + 18
7y = 2 + 18

Combine like terms: 2 + 18 = 20
7y = 20

Divide each side by '7'.
y = 2.857142857

Simplifying
y = 2.857142857

See similar equations:

| 0.5x^4-1.5x^3-5x^2+12x=0 | | -48=6(x+2) | | 20x^2+20x+5=0 | | -2(3x-6)=3x | | 18-4n=18-2(1+8n) | | 0.80x+0.20(50)=0.40(117) | | 16x^2+40x-72=0 | | 50=3(s+16)-2(s-2) | | x^2+4x-16=0 | | 6x^2-19x+15=0 | | 2x+2=1x+6 | | [5x+7]=-9 | | 15+3x=29+x | | 8+4(5n+6)-n= | | 8u+2(u-10)=0 | | -2(4s-1)-2=-2(9s+3)-3 | | 5x+7=-9 | | 2(2c+1)-c=-13 | | 7(2b+3)-4b=-59 | | 3(2n-11)=3(n+10) | | 7x-9=3x+19 | | -7(5x+3)= | | .5(x-3)+(1.5-x)=5x | | k+k+k=k+18 | | 3a+6=2a+9 | | -25-a=2a | | (X+2)y=5 | | 4.8f+6.4=-51.9 | | 4(a+2)-2a=10+3(a-3) | | 15-5z=24-8z | | 7*x-1=41 | | 7(12-n)=-84 |

Equations solver categories