An exponential equation is an equation in which a variable appears in the exponent. For example, in the equation 2^x = 8, x is the variable in the exponent.

Convert both sides to the same base: 16 = 2^4 and 64 = 2^6. Thus, 2^(4(x+5)) = 2^(6(-2)). This simplifies to 4(x+5) = -12, leading to x = -8.

The first step is often to express both sides of the equation with the same base, if possible.

Convert both sides to the same base: 16 = 2^4 and 256 = 2^8. This gives 2^(4(2x)) = 2^(8(2x+5)). Simplifying leads to 8x = 40, so x = -5.

Convert 64 to base 4: 64 = 4^3. Thus, p+2 = 3, leading to p = 1.

If two exponential expressions with the same base are equal, then their exponents must also be equal.

Convert both sides to the same base: 9 = 3^2 and 27 = 3^3. This gives 3^(2(8-x)) = 3^(3(x-3)). Simplifying leads to 16 - 2x = 3x - 9, so x = 5.