7^x+1^2x=22+9^2

Simple and best practice solution for 7^x+1^2x=22+9^2 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 7^x+1^2x=22+9^2 equation: 



7^x+1^2x=22+9^2

We move all terms to the left:

7^x+1^2x-(22+9^2)=0

We add all the numbers together, and all the variables

7^x+1^2x-103=0

We move all terms containing x to the left, all other terms to the right

7^x+1^2x=103

See similar equations:

| 9=3−–2t | | 1/4+20=-1/2n-4 | | 23z+74=25+92 | | -12=b+(-51) | | 4(9k+11)=225 | | 2(j+17)=100 | | 8x-13+9x-10=11x+13 | | 28=-15+x | | 3(x+5)=-25+6x | | 3d+4=2+3d-2 | | 5x-4(2-4x)=14 | | 6x+7-x=2x+19 | | -7r+2r-3r=-136 | | –3z+–9=3 | | 1/4x+3=2-3/4x | | 4(m-81)=24 | | 3936=82k | | 78=-2(x-3)-6x | | (8x+6)/3=x+7 | | -42v-5=52 | | 22+v=65 | | 5=s−7s= | | b/9+22=27 | | x+8+15=43 | | X^2-6x-93=-4 | | 15x+9=110 | | 2x+10+2x=10+2x–5 | | (9+5i)-(2+3i)=0 | | 25x+50=80x | | 15x+9=150 | | (9+5i)+(2+3i)=0 | | 14+17x=-2+4x |

Equations solver categories