5^(4x+1)+25^(2x)=3750

Simple and best practice solution for 5^(4x+1)+25^(2x)=3750 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 5^(4x+1)+25^(2x)=3750 equation: 



5^(4x+1)+25^(2x)=3750

We move all terms to the left:

5^(4x+1)+25^(2x)-(3750)=0

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

5^(4x+1)+25^2x=3750

See similar equations:

| -4x-12=-2(x+8) | | -8x+14=58 | | x^2+2x+16.5=0 | | x^2+26x-41.25=0 | | -7+4c=-15 | | (1/4x=3)=(3/4x-7) | | 5(x-7)=3x-43 | | (12x-6)-(5x-15)=(2x+4) | | 4^5x+1=32 | | 14^-10x=9^x-10 | | j/8-31=-25 | | 6(s+6)=78 | | Q=-2q+6 | | -5w+7(w-3)=-33 | | 3.x-2=x+8 | | –4a=24 | | 7(q-91)=21 | | 4t-15=-47 | | -3v+8(v+2)=-4 | | -v/3-2=-10 | | 5x/6+7x/3=10 | | 9b+23=50 | | -2y/3=6 | | 3(14+x)=57 | | (6x+29)=115 | | 5j-18=27 | | 4(3x-2)=-3(2x+7) | | x=9+1/3 | | -6r+(-8)=-26 | | 9(m+4)=72 | | -2(4+8x)+1=38-7x | | 18n^2+66n+36=0 |

Equations solver categories