Use the like bases property to solve the equation $$ \left(\frac{1}{2}\right)^{x+2}=2^{4 x+5} $$ $$ x=\square $$ Question Help: $$ \square $$ Video

Question

UpStudy AI · Accepted Answer

We start with the equation

$$
\left(\frac{1}{2}\right)^{x+2}=2^{4x+5}.
$$

Recognize that

$$
\frac{1}{2} = 2^{-1}.
$$

Substitute into the equation:

$$
(2^{-1})^{x+2} = 2^{4x+5}.
$$

Simplify the left-hand side using the exponent rule $$(a^{b})^{c}=a^{b\cdot c}$$:

$$
2^{-1\cdot (x+2)} = 2^{-x-2}.
$$

Now, the equation becomes:

$$
2^{-x-2}=2^{4x+5}.
$$

Since the bases are the same ($$2$$), we can set the exponents equal:

$$
-x-2 = 4x+5.
$$

Solve for $$ x $$ by first collecting like terms:

$$
-x - 4x = 5 + 2,
$$

$$
-5x = 7.
$$

Divide both sides by $$-5$$:

$$
x = -\frac{7}{5}.
$$

Thus, the solution is

$$
x = -\frac{7}{5}.
$$
$$ x = -\frac{7}{5} $$

Use the like bases property to solve the equation \( \left(\frac{1}{2}\right)^{x+2}=2^{4 x+5} \) \( x=\square \) Question Help: \( \square \) Video