Cassie T.
asked • 04/12/22let f(x)=x^(16/3) 019x^(33/7). Determine the largest n for which f is a member of the set C^n (n-times continuously differentiable)
This is a problem from calculus 1 and I'm not sure what the process is here? Are we to attempt to take a derivative, use Rolle's Theorem or something else? I'm looking for a procedure more than an answer, but an answer would be helpful as well.
More
1 Expert Answer
The given function has non-integer powers of x, which means we can differentiate by using power rule. The first-order derivative will have a term with a power of x exactly 1 less than the given function. The 2nd-order derivative will have a term with a power of x exactly 2 less than the original, etc.
We combine that idea with the fact that if a function contains a negative power of x (integer or non-integer) it will NOT be continuous at x = 0.
So for example, the cube root function, f(x) = x1/3 is itself continuous but it is not continuously differentiable (i.e. it is continuously differentiable 0 times) because its derivative, f'(x) = 1/3x-2/3 is not continuous at x = 0.
g(x) = x5/4 is continuously differentiable exactly once:
g'(x) = 5/4x1/4
Applying these concepts should allow you to determine a process for answering the question above.
Still looking for help? Get the right answer, fast.
Ask a question for free
Get a free answer to a quick problem.
Most questions answered within 4 hours.
OR
Find an Online Tutor Now
Choose an expert and meet online. No packages or subscriptions, pay only for the time you need.
Doug C.
The function definition is not clear, i.e. what is 019? Is this the product of two powers of x (not likely)--so something else?04/12/22