What are the challenges of solving partial derivative problems in mathematics?

[tandoorichicken]

Two homework problems I can't get.

(1) The question is find the first partial derivatives of the function. The problem is that the function in this problem is
[tex] f(x, y) = \int_{y}^{x} \cos{t^2} dt [/tex]
The main obstacle is getting past this function. I can't integrate it and neither can my calculator. Is there a way to do this problem without integrating, or how do you integrate this function?

(2) The voltage V in a simple electrical circuit is slowly decreasing as the battery wears out. The resistance R is slowly increasing as the resistor heats up. Use Ohm's Law, V = IR, to find how the current I is changing at the moment when R = 400[itex]\Omega[/itex], I = 0.08 A, [itex]\frac{dV}{dt}[/itex] = -0.01 V/s, and [itex]\frac{dR}{dt}[/itex] = 0.03 [itex]\Omega[/itex]/s.

 

[dextercioby]

1.How about applying the fundamental theorem of calculus...??Both parts of it.

2.Differentiate wrt time the Ohm's law and plug in tht #-s.

Daniel.

 

[xanthym]

Two homework problems I can't get.

(1) The question is find the first partial derivatives of the function. The problem is that the function in this problem is
[tex] f(x, y) = \int_{y}^{x} \cos{t^2} dt [/tex]
The main obstacle is getting past this function. I can't integrate it and neither can my calculator. Is there a way to do this problem without integrating, or how do you integrate this function?

(2) The voltage V in a simple electrical circuit is slowly decreasing as the battery wears out. The resistance R is slowly increasing as the resistor heats up. Use Ohm's Law, V = IR, to find how the current I is changing at the moment when R = 400[itex]\Omega[/itex], I = 0.08 A, [itex]\frac{dV}{dt}[/itex] = -0.01 V/s, and [itex]\frac{dR}{dt}[/itex] = 0.03 [itex]\Omega[/itex]/s.

{#1}

NO integration needed here. Use the Fundamental Theorem of Calculus:

[tex] f(x, y) = \int_{y}^{x} \cos{t^2} dt [/tex]

[tex] \frac {\partial f(x,y)} {\partial x} = \cos{x^2} [/tex]

[tex] \frac {\partial f(x,y)} {\partial y} = -\cos{y^2} [/tex]


Incidentally, in the more general case, we have:

[tex] f(x, y) = \int_{y}^{g(x)} h(t) dt [/tex]

[tex] \frac {\partial f(x,y)} {\partial x} = h(g(x))*g'(x) [/tex]


{#2}

V = I*R
-----> I = V/R
Using the Quotient Rule:
(dI/dt) = {(dV/dt)*R - V*(dR/dt)}/(R^2)
(dI/dt) = {(dV/dt)*R - (I*R)*(dR/dt)}/(R^2)
(dI/dt) = {(dV/dt) - (I)*(dR/dt)}/(R)

Placing given values into the above equation, we get:
(dI/dt) = {(-0.01 V/s) - (0.08 A)*(0.03 ohm/s)}/(400 ohm)
(dI/dt) = (-3.1)x10^(-5) Amps/sec
~

 

[dextercioby]

Well,the general idea of this specific forum is not to solve his problems entirely,but to help him solve them by himself.
I hope u'l get it.

Daniel.