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Could someone show me how to use the calculus operations of differentiation (sa'o) and integration (ri'o)?I also am newish to calculus, so I do not even know what "over range c" means for integration. I know that the derivative has "of degree c", so if c were to be 2, wouldn't that be the second derviative of the function with respect to some variable? Is this kind of the same thing for integration, just called differently? If not, how would I say the double integral of the function with respect to some variable?
Could someone show me how to use the calculus operations of differentiation (sa'o) and integration (ri'o)?
I also am newish to calculus, so I do not even know what "over range c" means for integration. I know that the derivative has "of degree c", so if c were to be 2, wouldn't that be the second derviative of the function with respect to some variable? Is this kind of the same thing for integration, just called differently? If not, how would I say the double integral of the function with respect to some variable?
I am not a newbie to calculus (IMO), however, I've sadly not made much use of the mekso.I suppose you've been doing derivatives at this point, and maybe you know that integration "undoes" derivation. If you've been paying attention, you'll've noticed that when you derive something, it drops the constants. And, from f'(x)'s point of view, that number could have been anything.So, one of the ways that you deal with this is you evaluate the integral at one value, then at another value, and subtract the two. The subtraction cancels out whatever that constant would be.(Of course, now I'm wondering how the limits of integration, and the indefinite integral, would be written)
I am not a newbie to calculus (IMO), however, I've sadly not made much use of the mekso.
I suppose you've been doing derivatives at this point, and maybe you know that integration "undoes" derivation. If you've been paying attention, you'll've noticed that when you derive something, it drops the constants. And, from f'(x)'s point of view, that number could have been anything.
So, one of the ways that you deal with this is you evaluate the integral at one value, then at another value, and subtract the two. The subtraction cancels out whatever that constant would be.
(Of course, now I'm wondering how the limits of integration, and the indefinite integral, would be written)
>>1416"bi'o" for limits and "zi'o" for indefinite?
>>1416
"bi'o" for limits and "zi'o" for indefinite?