first 17 assignment #001 ލ܈y[ HĒj Liberal Arts Mathematics I 03-15-2007 نxWrؒb[ě assignment #017 ލ܈y[ HĒj Calculus I 03-15-2007
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14:25:19 Explain in terms of the contribution to the integral from a small increment `dx why the integral of f(x) - g(x) over an interval [a, b] is equal to the integral of f(x) over the interval minus the integral of g(x) over the same integral.
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RESPONSE --> (f(x) - g(x)) 'dx sum (f(x) - g(x)) 'dx sum (f(x) 'dx - g(x) 'dx) f(x) 'dx - sum g(x) 'dx int is the definite intergral of the function. int (f(x), x, a, b) - int (g(x), x, a, b)
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14:25:23 ** In terms of the contribution from a single increment, the rectangle has 'altitude' f(x) - g(x) so its area is [ f(x) - g(x) ] `dx. Adding up over all increments we get sum { [ f(x) - g(x) ] `dx, which by the distributive law of addition over multiplication is sum [ f(x) `dx - g(x) `ds ], which is not just a series of additions and can be rearrange to give sum (f(x) `dx) - sum (g(x) `dx). As the interval `dx shrinks to zero, the sums approach the definite integrals and we get int( f(x), x, a, b ) - int(g(x), x, a, b), where int ( function, variable, left limit, right limit) is the definite integral of 'function' with respect to 'variable' from 'left limit' to 'right limit'.**
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14:28:55 Explain why the if f(x) > m for all x on [a,b], the integral of f(x) over this interval is greater than m (b-a).
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RESPONSE --> when f(x)>m for all x, then any interval contribution to the sum will be more than 'dx * m. when you add up all the contribution the answer is more than the product of m and the sum of the 'dx. The sum of the 'dx is equal to b-a length. then the sum must be grater than the product of m
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14:28:56 ** This is also in the text, so look there for an alternative explanation and full rigor. The idea is that if f(x) > m for all x, then for any interval the contribution to the Riemann sum will be greater than m * `dx. So when all the contributions are added up the result is greater than the product of m and the sum of all `dx's. The sum of all `dx's is equal to the length b-a of the entire interval. So the Riemann sum must be greater than the product of m and this sum--i.e., greater than m * ( b - a ). **
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14:39:46 Explain why the integral of f(x) / g(x) is not generally equal to the integral of f(x) divided by the integral of g(x).
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RESPONSE --> The intergral of f(x) is the area under the curve between two points. The intergral of g(x) is the area under its curve between the same two points. when you take f(x) / g(x) it give you a different curve.
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14:39:48 ** For now assume that f and g are both positive functions. The integral of f(x) represents the area beneath the curve between the two limits, and the integral of g(x) represents the area beneath its curve between the same two limits. So the integral of f(x) divided by the integral of g(x) represents the first area divided by the second. The function f(x) / g(x) represents the result of dividing the value of f(x) by the value of g(x) at every x value. This gives a different curve, and the area beneath this curve has nothing to do with the quotient of the areas under the original two curves. It would for example be possible for g(x) to always be less than 1, so that f(x) / g(x) would always be greater than f(x) so that the integral of f(x) / g(x) would be greater than the integral of f(x), while the length of the interval is very long so that the area under the g(x) curve would be greater than 1. In this case the integral of f(x) divided by the integral of g(x) would be less than the integral of f(x), and would hence be less than the integral of f(x) / g(x). **
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14:44:23 Given a graph of f(x) and the fact that F(x) = 0, explain how to construct a graph of F(x) such that F'(x) = f(x). Then explain how, if f(x) is the rate at which some quantity changes with respect to x, this construction gives us a function representing how much that quantity has changed since x = 0.
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RESPONSE --> The taller the graph of f(x), the more steep the graph F(x) will be. If f(x) goes below the x axis, then F(x) will steeply go down depending on how far f(x) goes below the x axis.
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14:44:25 ** To construct the graph you could think of finding areas. You could for example subdivide the graph into small trapezoids, and add the area of each trapezoid to the areas of the ones preceding it. This would give you the approximate total area up to that point. You could graph total area up to x vs. x. This would be equivalent to starting at (0,0) and drawing a graph whose slope is always equal to the value of f(x). The 'higher' the graph of f(x), the steeper the graph of F(x). If f(x) falls below the x axis, F(x) will decrease with a steepness that depends on how far f(x) is below the axis. If you can see why the two approaches described here are equivalent, and why if you could find F(x) these approaches would be equivalent to what you suggest, you will have excellent insight into the First Fundamental Theorem. **
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14:46:00 Query problem 3.1.16 (3d edition 3.1.12 ) (formerly 4.1.13) derivative of fourth root of x. What is the derivative of the given function?
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RESPONSE --> y = x^n y = x^(1/4) y' = n * x^n-1 y' = 1/4 * x^1/4-4/4 y' = 1/4 * x^3/4
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14:46:03 The derivative y=x^(1/4), which is of the form y = x^n with n = 1/4, is y ' = n x^(n-1) = 1/4 x^(1/4 - 1) = 1/4 x^(-3/4). *&*&
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14:48:21 Query problem 3.1.27 (formerly 4.1.24) derivative of (`theta-1)/`sqrt(`theta) What is the derivative of the given function?
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RESPONSE --> ('theta - 1) / 'sqrt('theta) = 'theta / 'sqrt('theta) - 1 / 'sqrt('theta) = 'sqrt('theta) - 1 / 'sqrt('theta) = 'theta^1/2 - 'theta^-1/2 1/2 'theta^-1/2 - -1/2 'theta^-3/2
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14:48:23 ** (`theta-1) / `sqrt(`theta) = `theta / `sqrt(`theta) - 1 / `sqrt(`theta) = `sqrt(`theta) - 1 / `sqrt(`theta) = `theta^(1/2) - `theta^(-1/2). The derivative is therefore found as derivative of the sum of two power functions: you get 1/2 `theta^(-1/2) - (-1/2)`theta^(-3/2), which simplifies to 1/2 [ `theta^(-1/2) + `theta^(-3/2) ]. . **
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14:51:50 Query problem 3.1.60 (3d edition 3.1.48) (formerly 4.1.40) function x^7 + 5x^5 - 4x^3 - 7 What is the eighth derivative of the given function?
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RESPONSE --> x^7 + 5x^5 - 4x^3 - 7 7x^6 + 25x^4 - 12x^2 42x^5 + 100x^3 - 24x 210x^4 + 300x^2 840x^3 + 600x 2520x^2 5040x
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14:51:52 ** The first derivative is 7 x^6 + 25 x^4 - 12 x^3. The second derivative is the derivative of this expression. We get 42 x^5 + 200 x^3 - 36 x^2. It isn't necessary to keep taking derivatives if we notice the pattern that's emerging here. If we keep going the highest power will keep shrinking but its coefficient will keep increasing until we have just 5040 x^0 = 5050 for the seventh derivative. The next derivative, the eighth, is the derivative of a constant and is therefore zero. The main idea here is that the highest power is 7, and since the power of the derivative is always 1 less than the power of the function, the 7th derivative of the 7th power must be a multiple of the 0th power, which is constant. Then the 8th derivative is the derivative of a constant and hence zero. **
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14:52:43 Query problem 3.2.4 (3d edition 3.2.6) (formerly 4.2.6) derivative of 12 e^x + 11^x. What is the derivative of the given function?
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RESPONSE --> 12 e^x + 11^x 12 e^x + ln(11) * 11^x
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14:52:44 ** The derivative of a^x is ln(a) * a^x. So the derivative of 11^x is ln(11) * 11^x. The derivative of the given function is therefore 12 e^x + ln(11) * 11^x. **
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14:53:47 Query problem 3.2.10 (3d edition 3.2.19) (formerly 4.2.20) derivative of `pi^2+`pi^x. What is the derivative of the given function?
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RESPONSE --> `pi^2+`pi^x ln('pi) * 'pi^x
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14:53:49 ** `pi is a constant and so therefore is `pi^2. Its derivative is therefore zero. `pi^x is of the form a^x, which has derivative ln(a) * a^x. The derivative of `pi^x is thus ln(`pi) * `pi^x. **
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14:56:34 Query problem 3.2.40 (3d edition 3.2.30) (formerly 4.2.34) value V(t) = 25(.85)^6, in $1000, t in years since purchase. What are the value and meaning of V(4) and ov V ' (4)?
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RESPONSE --> v(4) is the value of the automobile when it is 4 years old. v'(4) is the rate at which the value of the automobile is changing at the end of the 4th year.
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14:56:37 ** V(4) is the value of the automobile when it is 4 years old. V'(t) = 25 * ln(.85) * .85^t. You can easily calculate V'(4). This value represents the rate at which the value of the automobile is changing, in dollars per year, at the end of the 4th year. **
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14:56:39 Query Add comments on any surprises or insights you experienced as a result of this assignment.
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