n^2+(n+1)^2=365

Simple and best practice solution for n^2+(n+1)^2=365 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 n^2+(n+1)^2=365 equation: 



n^2+(n+1)^2=365

We move all terms to the left:

n^2+(n+1)^2-(365)=0

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

n^2+(n+1)^2=365

See similar equations:

| y-17=18 | | 2(-2-3x)=-9x-4 | | 2x+49=9x+7 | | (x+4)(x+1)=49 | | -2x+29=13 | | 4x-8-9=3-3x+15 | | -10h+11=81 | | (30+x)/5=20 | | 4x2-15x+13=6x+8 | | (6x+1)+(4x-11)=180 | | 2n^2+2n-364=0 | | n-28=11 | | (6x+1)+(4x-11=180 | | (x+4)(x+3)=49 | | 1+6m=73 | | x2+13x+25=2x+1 | | -92=4-8n | | x2+19x+37=5x-3 | | 2(x+6)=3(x-4 | | 1x-9Y-27=0 | | -11+y/5=-7 | | (x-1)^2=-16 | | 1/5x+8=2/5+10 | | c/3+-24=-33 | | 5(2x+3)+3=(x-2) | | x÷7=3÷5 | | 5(x-1)=2+4(x-1) | | x2+6x-8=8 | | -10b+-20=-90 | | q-29/8=7 | | 90=12+-3f | | 3y=30-6y+24 |

Equations solver categories