Use reduction formulas to evaluate the integral. $$ \int \sin ^{5}(7 x) d x $$

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To evaluate the integral $$ \int \sin^5(7x) \, dx $$, we can use reduction formulas. The reduction formula for $$ \int \sin^n(x) \, dx $$ is given by:

$$
\int \sin^n(x) \, dx = -\frac{1}{n} \sin^{n-1}(x) \cos(x) + \frac{n-1}{n} \int \sin^{n-2}(x) \, dx
$$

In our case, we have $$ n = 5 $$ and we need to adjust for the argument $$ 7x $$. Thus, we will use the formula as follows:

1. **Apply the reduction formula**:
   $$
   \int \sin^5(7x) \, dx = -\frac{1}{5} \sin^4(7x) \cos(7x) + \frac{4}{5} \int \sin^3(7x) \, dx
   $$

2. **Now we need to evaluate $$ \int \sin^3(7x) \, dx $$**. We can apply the reduction formula again:
   $$
   \int \sin^3(7x) \, dx = -\frac{1}{3} \sin^2(7x) \cos(7x) + \frac{2}{3} \int \sin(7x) \, dx
   $$

3. **Next, we evaluate $$ \int \sin(7x) \, dx $$**:
   $$
   \int \sin(7x) \, dx = -\frac{1}{7} \cos(7x)
   $$

4. **Substituting back**:
   $$
   \int \sin^3(7x) \, dx = -\frac{1}{3} \sin^2(7x) \cos(7x) + \frac{2}{3} \left(-\frac{1}{7} \cos(7x)\right)
   $$
   $$
   = -\frac{1}{3} \sin^2(7x) \cos(7x) - \frac{2}{21} \cos(7x)
   $$

5. **Now substitute $$ \int \sin^3(7x) \, dx $$ back into the equation for $$ \int \sin^5(7x) \, dx $$**:
   $$
   \int \sin^5(7x) \, dx = -\frac{1}{5} \sin^4(7x) \cos(7x) + \frac{4}{5} \left(-\frac{1}{3} \sin^2(7x) \cos(7x) - \frac{2}{21} \cos(7x)\right)
   $$

6. **Combine the terms**:
   $$
   = -\frac{1}{5} \sin^4(7x) \cos(7x) - \frac{4}{15} \sin^2(7x) \cos(7x) - \frac{8}{105} \cos(7x)
   $$

7. **Factor out $$ \cos(7x) $$**:
   $$
   = \cos(7x) \left(-\frac{1}{5} \sin^4(7x) - \frac{4}{15} \sin^2(7x) - \frac{8}{105}\right) + C
   $$

Thus, the final result for the integral $$ \int \sin^5(7x) \, dx $$ is:

$$
\int \sin^5(7x) \, dx = \cos(7x) \left(-\frac{1}{5} \sin^4(7x) - \frac{4}{15} \sin^2(7x) - \frac{8}{105}\right) + C
$$

where $$ C $$ is the constant of integration.
The integral $$ \int \sin^5(7x) \, dx $$ evaluates to: $$ \cos(7x) \left(-\frac{1}{5} \sin^4(7x) - \frac{4}{15} \sin^2(7x) - \frac{8}{105}\right) + C $$ where $$ C $$ is the constant of integration.

Use reduction formulas to evaluate the integral. \( \int \sin ^{5}(7 x) d x \)

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