- #1
LyleX^Y
- 4
- 0
can you guyz help me with a quick derivative?
eeeex
eeeex
LyleX^Y said:awww sorry this isn't a homework actually I am just thinking of a problem my teacher would do. hehe sorry
i got
d/dx=(eeeex)*(d/dx eeex)*(d/dx eex)*(d/dx ex)
i just can't get past that point i don't know how to do the product rule with 3 values.
gabbagabbahey said:Well, so far so good (although it's the chain rule you're using, not the product rule)
Now try computing each of the derivatives in that product (use the chain rule again)... what are (d/dx eeex), (d/dx eex) and (d/dx ex)?
LyleX^Y said:dont i have to use the product rule for the 3 that i haven't take the d/dx of?
"(d/dx eeex), (d/dx eex) and (d/dx ex)?
LyleX^Y said:awww sorry this isn't a homework actually I am just thinking of a problem my teacher would do. hehe sorry
i got
d/dx=(eeeex)*(d/dx eeex)*(d/dx eex)*(d/dx ex)
i just can't get past that point i don't know how to do the product rule with 3 values.
cragar said:could we differentiate it like a^x by so it owuld be lna*a^x
"Annoying d/dx" is a mathematical concept that represents the derivative of a function. It is often used in calculus to find the rate of change of a function at a specific point.
"Annoying d/dx" can be a difficult concept for some people to understand and can require a lot of practice and calculations. This can make it annoying for some individuals, hence the name.
Some common mistakes people make when working with "Annoying d/dx" include forgetting to apply the chain rule, miscalculating the derivative of a function, and not simplifying their final answer.
"Annoying d/dx" is used in various fields, including physics, engineering, and economics. It can be used to calculate rates of change, such as velocity and acceleration, and to optimize functions in order to solve real-world problems.
Yes, some tips for understanding and working with "Annoying d/dx" include practicing regularly, understanding the fundamental rules and properties, and seeking help from a tutor or teacher if necessary. It is also important to have a good understanding of algebra and trigonometry before diving into "Annoying d/dx".