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==tests solution== | ==tests solution== | ||
+ | 1) | ||
+ | a) | ||
+ | b) | ||
+ | 2)a) f(x) = int(o,sqrtx)of e^t^2 dt | ||
+ | chain rule | ||
+ | where u = squrt x | ||
+ | using funamental therem of calc | ||
+ | f(u)= int(0,u) of e^t^2 dt | ||
+ | = e^u^2(1/2*x^(-1/2)) | ||
+ | = (e^x)/(2sqrt(x)) | ||
+ | |||
+ | lim of x as x goes to inf x/f(x)= | ||
+ | lim of x as x goes to inf 1/f'(x)= | ||
+ | lim of x as x goes to inf 1/(e^x/(2sqrt(x))= | ||
+ | lim of x as x goes to inf (2sqrt(x))/(e^x)= | ||
+ | lim of x as x goes to inf 1/(sqrt(x)e^x)= | ||
+ | 0 | ||
+ | 3) | ||
+ | |||
+ | 4) |
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tests solution
1)
a) b)
2)a) f(x) = int(o,sqrtx)of e^t^2 dt
chain rule where u = squrt x using funamental therem of calc f(u)= int(0,u) of e^t^2 dt = e^u^2(1/2*x^(-1/2)) = (e^x)/(2sqrt(x))
lim of x as x goes to inf x/f(x)= lim of x as x goes to inf 1/f'(x)= lim of x as x goes to inf 1/(e^x/(2sqrt(x))= lim of x as x goes to inf (2sqrt(x))/(e^x)= lim of x as x goes to inf 1/(sqrt(x)e^x)= 0
3)
4)