Answer :
Final answer:
The derivative of the function y = x⁹x is 9x⁹ln(x), derived using the chain and product rules, making (d) the correct option.
Explanation:
The derivative of the function y = x⁹x is (d) 9x⁹ln(x). To derive this, we use the property that the derivative of xnx is nxn-1ln(x) + xn (due to the product rule and the fact that the derivative of eln(x) is eln(x)/x). However, since the exponent here is also the base, we employ the chain rule alongside the product rule to get the following steps:
- Let z = x9x, then ln(z) = 9ln(x),
- Differentiate both sides with respect to [tex]x: 1/z dz/dx = 9/x,[/tex]
- Multiply both sides by z to isolate[tex]dz/dx: dz/dx = 9z/x,[/tex]
- Substitute z back with [tex]x9x: dz/dx = 9x9x/x,[/tex]
- Finally, simplify to get[tex]dz/dx = 9x8x (since x9x / x is x8x).[/tex]
This gives us the derivative of [tex]y = x⁹x as 9x⁹ln(x)[/tex], so the correct answer is option (d).
Final answer:
The derivative of y = x * x^9 using the product rule is 10x^9. However, this result is not listed among the multiple-choice options given, suggesting a possible mistake in the provided function or answer choices.
Explanation:
The function given is y = xx^9, which is not one of the typical forms you might see. Let's rewrite it for clarity as y = x * x^9. To find its derivative, use the product rule from calculus, which states that the derivative of a product of two functions is the derivative of the first times the second plus the first times the derivative of the second. Applying this rule, we get:
D(x) = D(x) * x^9 + x * D(x^9)
where D() denotes the derivative of a function. The derivative of x is 1, and the derivative of x^9 is 9x^8. Plugging these into the equation, we get:
D(x) = 1 * x^9 + x * 9x^8
Combining like terms gives us the final derivative:
D(x) = x^9 + 9x^9
This is not one of the answer choices provided. However, the expression can be simplified further:
D(x) = 10x^9
This indicates there might be a mistake in the original function provided or the answer choices given, as none of the provided choices match this result. Therefore, it's essential to re-examine the question for any potential typos or to confirm the correct expression for the function whose derivative is sought.
