Find the domain of $$ f $$ and write your answer in interval notation. $$ f(x)=8 \sqrt{5-7 x}+6 $$ Question Help: Video Submit Question

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1. The function is given by $$ f(x) = 8 \sqrt{5 - 7x} + 6 $$.

2. To determine the domain, we need to ensure that the expression inside the square root is non-negative:
   $$
   5 - 7x \geq 0
   $$

3. Solve the inequality:
   $$
   5 - 7x \geq 0 \implies -7x \geq -5 \implies x \leq \frac{5}{7}
   $$

4. Thus, the domain of $$ f $$ consists of all real numbers $$ x $$ such that $$ x \leq \frac{5}{7} $$.

5. In interval notation, the domain is:
   $$
   (-\infty, \frac{5}{7}]
   $$
The domain of $$ f(x) = 8 \sqrt{5 - 7x} + 6 $$ is all real numbers $$ x $$ where $$ x \leq \frac{5}{7} $$, which in interval notation is $$ (-\infty, \frac{5}{7}] $$.

Find the domain of \( f \) and write your answer in interval notation. \( f(x)=8 \sqrt{5-7 x}+6 \) Question Help: Video Submit Question

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