e derivative of the function $$ F(x)=\left(\frac{7 x-1}{6-7 x}\right)^{5} $$

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We start with the function
  F(x) = [(7x – 1)/(6 – 7x)]⁵.

Step 1. Define the inner function:
  g(x) = (7x – 1)/(6 – 7x).

Then, F(x) = [g(x)]⁵.

Step 2. Apply the Chain Rule:
  F′(x) = 5[g(x)]⁴ · g′(x).

Step 3. Compute g′(x) using the Quotient Rule. For g(x) = N(x)/D(x) where:
  N(x) = 7x – 1  and  D(x) = 6 – 7x,
  N′(x) = 7  and  D′(x) = –7.

The Quotient Rule states:
  g′(x) = [N′(x)D(x) – N(x)D′(x)] / [D(x)]².

Plug in the values:
  g′(x) = [7(6 – 7x) – (7x – 1)(–7)] / (6 – 7x)²
      = [7(6 – 7x) + 7(7x – 1)] / (6 – 7x)²
      = [42 – 49x + 49x – 7] / (6 – 7x)²
      = 35 / (6 – 7x)².

Step 4. Combine using the Chain Rule:
  F′(x) = 5[g(x)]⁴ · (35/(6 – 7x)²)
      = 5 · 35 · [(7x – 1)/(6 – 7x)]⁴ / (6 – 7x)²
      = 175 · (7x – 1)⁴ / (6 – 7x)⁴ · 1/(6 – 7x)²
      = 175 · (7x – 1)⁴ / (6 – 7x)^(4+2)
      = 175 · (7x – 1)⁴ / (6 – 7x)⁶.

Thus, the derivative of F(x) is:
  F′(x) = 175(7x – 1)⁴ / (6 – 7x)⁶.
The derivative of $$ F(x) = \left(\frac{7x - 1}{6 - 7x}\right)^5 $$ is $$ F′(x) = \frac{175(7x - 1)^4}{(6 - 7x)^6} $$.

e derivative of the function \( F(x)=\left(\frac{7 x-1}{6-7 x}\right)^{5} \)

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