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Evaluate the following limits, if necessary use l’Hôpital Rule:
`lim_(x -> x/2) secx/tanx`
Concept: undefined >> undefined
Evaluate the following limits, if necessary use l’Hôpital Rule:
`lim_(x -> oo) "e"^-x sqrt(x)`
Concept: undefined >> undefined
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Evaluate the following limits, if necessary use l’Hôpital Rule:
`lim_(x -> 0) (1/sinx - 1/x)`
Concept: undefined >> undefined
Evaluate the following limits, if necessary use l’Hôpital Rule:
`lim_(x -> 1^+) (2/(x^2 - 1) - x/(x - 1))`
Concept: undefined >> undefined
Evaluate the following limits, if necessary use l’Hôpital Rule:
`lim_(x -> 0^+) x^x`
Concept: undefined >> undefined
Evaluate the following limits, if necessary use l’Hôpital Rule:
`lim_(x -> oo) (1 + 1/x)^x`
Concept: undefined >> undefined
Evaluate the following limits, if necessary use l’Hôpital Rule:
`lim_(x -> pi/2) (sin x)^tanx`
Concept: undefined >> undefined
Evaluate the following limits, if necessary use l’Hôpital Rule:
`lim_(x -> 0^+) (cos x)^(1/x^2)`
Concept: undefined >> undefined
Evaluate the following limits, if necessary use l’Hôpital Rule:
If an initial amount A0 of money is invested at an interest rate r compounded n times a year, the value of the investment after t years is A = `"A"_0 (1 + "r"/"n")^"nt"`. If the interest is compounded continuously, (that is as n → ∞), show that the amount after t years is A = A0ert
Concept: undefined >> undefined
Choose the correct alternative:
The value of the limit `lim_(x -> 0) (cot x - 1/x)` is
Concept: undefined >> undefined
Find the partial dervatives of the following functions at indicated points.
f(x, y) = 3x2 – 2xy + y2 + 5x + 2, (2, – 5)
Concept: undefined >> undefined
Find the partial dervatives of the following functions at indicated points.
g(x, y) = 3x2 + y2 + 5x + 2, (2, – 5)
Concept: undefined >> undefined
Find the partial derivatives of the following functions at indicated points.
h(x, y, z) = x sin (xy) + z2x, `(2, pi/4, 1)`
Concept: undefined >> undefined
Find the partial derivatives of the following functions at the indicated points.
`"G"(x, y) = "e"^(x + 3y) log(x^2 + y^2), (- 1, 1)`
Concept: undefined >> undefined
For the following functions find the fx, and fy and show that fxy = fyx
f(x, y) = `(3x)/(y + sinx)`
Concept: undefined >> undefined
For the following functions find the fx, and fy and show that fxy = fyx
f(x, y) = `tan^-1 (x/y)`
Concept: undefined >> undefined
For the following functions find the fx, and fy and show that fxy = fyx
f(x, y) = `cos(x^2 - 3xy)`
Concept: undefined >> undefined
If U(x, y, z) = `(x^2 + y^2)/(xy) + 3z^2y`, find `(del"U")/(delx), (del"U")/(dely)` and `(del"U")/(del"z)`
Concept: undefined >> undefined
If U(x, y, z) = `log(x^3 + y^3 + z^3)`, find `(del"U")/(delx) + (del"U")/(dely) + (del"U")/(del"z)`
Concept: undefined >> undefined
For the following functions find the gxy, gxx, gyy and gyx
g(x, y) = xey + 3x2y
Concept: undefined >> undefined
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