(t+1)^4+(t+5)^4=82

Simple and best practice solution for (t+1)^4+(t+5)^4=82 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 (t+1)^4+(t+5)^4=82 equation: 



(t+1)^4+(t+5)^4=82

We move all terms to the left:

(t+1)^4+(t+5)^4-(82)=0

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

(t+1)^4+(t+5)^4=82

See similar equations:

| 2=2/3x1x2/3 | | -n-1=-6n+9 | | 9a^2=-27a-20 | | 2z=-2z+4 | | 15x+53=5x+6 | | 7u=-2+6u | | −(4+h)=3h3 | | 8+4g=5g | | -4x=(2) | | 9f=10f+4 | | 9f=10f | | 8.k/4=2 | | -6+25=x-24 | | -2x=1,01 | | 2y+1=29 | | 6x+12=2x+x | | 7x-4+9x=40 | | X/6+5=x-2 | | (6-2x)+2(4+4x)=62 | | 5=x-17/12x | | -3-x=-3x-5 | | 2^1,5x=128 | | -7x+1=2(-3x-2)+5 | | x^2+2/3x-3=0 | | 2(3-x)=3+3x-5x+3 | | (10x+1)=(3x+18)+(3x+11) | | 13x-1=9x-12 | | 2/3(-9x-12)=24 | | 2x-5+(5x-15)=52 | | u−4=8 | | 3x/3+1/3=5x/6-1 | | 2=g/3 |

Equations solver categories