To find the third-degree Taylor polynomial T3(x) for the function f(x) = tan-1(x) centered at x = 7, we need to calculate the derivatives of f at that point and use them in the Taylor series expansion.
The Taylor polynomial of degree n for a function f centered at a point a is given by:
Tn(x) = f(a) + f'(a)(x – a) + f”(a)(x – a)2/2! + f”'(a)(x – a)3/3! + …
1. **Calculate the function value at a = 7:**
f(7) = tan-1(7)
2. **Calculate the first derivative:**
f'(x) = 1 / (1 + x2)
Now plug in x = 7:
f'(7) = 1 / (1 + 72) = 1 / 50
3. **Calculate the second derivative:**
f”(x) = -2x / (1 + x2)2
Again, plug in x = 7:
f”(7) = -2(7) / (1 + 72)2 = -14 / 2500 = -7 / 1250
4. **Calculate the third derivative:**
Using the quotient rule, we find:
f”'(x) = [2(1 + x2)2(1) – (-2x)(2)(1 + x2)(2x)] / (1 + x2)4
Calculating f”'(7) will give us the third derivative at x = 7.
Finally, substitute all these values into the Taylor polynomial formula:
T3(x) = f(7) + f'(7)(x – 7) + f”(7)(x – 7)2/2! + f”'(7)(x – 7)3/3!
After calculating these derivatives and substituting, you will arrive at the third-degree Taylor polynomial T3(x) for f(x) = tan-1(x) centered at x = 7.