That is log3(arcsec(2x))?vipertongn said:Homework Statement
find dy/dx of log3*arccsc2^x
I have no idea how you got that! How did "arcsec" become "csc"? The derivative of log x is 1/x so you should have 1/(arcsec(2x)) times the derivative of that denominator.The Attempt at a Solution
I got up to 1/ln3csc2^x * 1/2^x(sqrt(2^2x-1)
[tex]2^x= e^{ln(2^x)}= e^{x ln(2)}[/tex] so the derivative of 2x is ln(2)2x.However there's also a 2^x*ln2 after that
How is that?
In otherwords how would I derive 2^x would i treat it like e^x or something?
Also if its x^x why would that be 1+lnx?
The derivative of log3*arccsc2^x is 1/(x*ln(3)*sqrt(4^x-1)).
To solve for dy/dx, you can use the chain rule and the product rule. First, rewrite the function as log3*(sin^-1(2^x)). Then, use the chain rule to find the derivative of the outer function log3, which is 1/(x*ln(3)). Next, use the product rule to find the derivative of the inner function sin^-1(2^x), which is 1/(sqrt(4^x-1)*ln(2)). Finally, multiply these two derivatives together to find the final derivative of log3*arccsc2^x.
Yes, the derivative can be simplified to 1/(x*ln(3)*sqrt(4^x-1)). This simplification is possible by factoring out a common term of ln(2) from the numerator and denominator.
Yes, there is a restriction on the value of x for this derivative. The function arccsc2^x is only defined for values of x where 4^x-1 is greater than or equal to zero. This means that x must be greater than or equal to 0.25.
Yes, there is an alternate way to write this derivative. Using the properties of logarithms, the function log3*arccsc2^x can also be written as log3*(1/sin^-1(2^x)). This can be further simplified to log3*(1/csc^-1(2^x)), which can then be rewritten as log3*(cot^-1(2^x)). The final derivative can be written as -1/(x*ln(3)*sqrt(4^x-1)).