1.99 See Answer

Question: If the circle C rolls on the


If the circle C rolls on the outside of the fixed circle, the curve traced out by P is called an epicycloid. Find parametric equations for the epicycloid.


> Find the sum of the series. (-3)' Σ "-1 3n n-1

> Determine whether the series is conditionally convergent, absolutely convergent, or divergent. (-1)"/n Σ In n n-2

> Determine whether the series is conditionally convergent, absolutely convergent, or divergent. (-1)"(n Σ 22a+1 (-17(л + 1)3" 2n1

> Evaluate the integral. *w/2 · dx m/2 1 + cos'x

> Find the slope of the tangent line to the given curve at the point corresponding to the specified value of the parameter. r3 3 + сos 30; ө — п/2

> Determine whether the series is conditionally convergent, absolutely convergent, or divergent. E (-1) 'n-1/3

> Determine whether the series is convergent or divergent. Vn + 1 – Vn – 1 п — R-1

> Determine whether the series is convergent or divergent. E (-1)"-1. n + 1 n-1

> Determine whether the series is convergent or divergent. (-5)2n Σ n²9"

> Determine whether the series is convergent or divergent. 1.3. 5. (2n – 1) R-1 5"n!

> Determine whether the series is absolutely convergent or conditionally convergent. (-1)" Σ n-1 n' + 1 3

> Determine whether the series is convergent or divergent. 2n n° Σ | (1 + 2n²)"

> Determine whether the series is convergent or divergent. cos 3n Σ 1 + (1.2)" n-

> Determine whether the series is convergent or divergent. n Σ E In Зп + 1 n-1

> Evaluate the integral. 1 + 12t dt 1+ 3t

> Determine whether the sequence converges or diverges. If it converges, find the limit. (-1)" - an 2n

> Determine whether the series is convergent or divergent. 1 Σ n=2 n/In n

> Determine whether the series is convergent or divergent. (-1)" Σ Vn + 1

> Determine whether the series is convergent or divergent. n? + 1 Σ n3 + 1

> Evaluate the indefinite integral. Illustrate, and check that your answer is reasonable, by graphing both the function and its antiderivative (take C − 0). 2% dx Sxe

> A sequence is defined recursively by the equations a1 = 1, an+1 = 1 3 (an +4). Show that {an} is increasing and an < 2 for all n. Deduce that / is convergent and find its limit.

> Determine whether the sequence is convergent or divergent. If it is convergent, find its limit. {(-10)"/n!}

> Evaluate the integral. | tan?x dx

> Determine whether the sequence is convergent or divergent. If it is convergent, find its limit. {(1 + 3/n)+"}

> Determine whether the sequence is convergent or divergent. If it is convergent, find its limit. In n an in

> Find the Taylor polynomial T3(x) for the function f centered at the number a. Graph f and T3 on the same screen. f(x) cos х, a = T /2

> Determine whether the sequence is convergent or divergent. If it is convergent, find its limit. а, — сos(пт/2)

> Sketch the parametric curve and eliminate the parameter to find the Cartesian equation of the curve. х — cos 0, у —sec 0, 0 <0 < п/2

> Sketch the parametric curve and eliminate the parameter to find the Cartesian equation of the curve. х —1+ е", у — е' y

> First make a substitution and then use integration by parts to evaluate the integral. arcsin(In x) dx

> Sketch the parametric curve and eliminate the parameter to find the Cartesian equation of the curve. x = t² + 4t, y = 2 – 1, -4 < t<1

> Evaluate the integral. ax

> The astronomer Giovanni Cassini (1625&acirc;&#128;&#147;1712) studied the family of curves with polar equations where a and c are positive real numbers. These curves are called the ovals of Cassini even though they are oval shaped only for certain values

> A family of curves has polar equations Investigate how the graph changes as the number a changes. In particular, you should identify the transitional values of a for which the basic shape of the curve changes. 1 — а сos0 1+а сos0

> Use your graph in Problem 3 to estimate the value of / for which f(/) is a maximum under Planck’s Law. Data from Problem 3: Graph f as given by both laws on the same screen and comment on the similarities and differences. Use T = 5700 K (the temperatur

> Use the Maclaurin series for cos x to compute cos 58 correct to five decimal places.

> Graph f as given by both laws on the same screen and comment on the similarities and differences. Use T = 5700 K (the temperature of the sun). (You may want to change from meters to the more convenient unit of micrometers: 1 mm − 1026 m.)

> Use a Taylor polynomial to show that, for large wavelengths, Planck’s Law gives approximately the same values as the Rayleigh-Jeans Law.

> Use l&acirc;&#128;&#153; Hospital&acirc;&#128;&#153;s Rule to show that for Planck&acirc;&#128;&#153;s Law. So this law models blackbody radiation better than the Rayleigh-Jeans Law for short wavelengths. lim f(A) = 0 and lim f(A) = 0 %3D %3D A0+

> First make a substitution and then use integration by parts to evaluate the integral. e In(1 + x) dx

> Evaluate the integral.

> Evaluate the integral. t² sin ßt dt 2

> Investigate how the graph off changes as T varies. (Use Planck’s Law.) In particular, graph f for the stars Betelgeuse (T = 3400 K), Procyon (T = 6400 K), and Sirius (T = 9200 K), as well as the sun. How does the total radiation emitted (the area under t

> Use a computer algebra system to find the exact area of the surface obtained by rotating the curve / Then approximate your result to three decimal places.

> Find the volume of the solid obtained by rotating the region of Problem 2 about the line y = x - 2. Data from Problem 2: Find the area of the region shown in the figure below. yA (2π, 2π) y=x+ sin x y=x- 2

> Find a formula (similar to the one in Problem 1) for the volume of the solid obtained by rotating 5 about the line y = mx + b. Data from Problem 1: Show that the area of / is R

> Find the area of the region shown in the figure below. yA (2π, 2π) y=x+ sin x y=x- 2

> Show that the area of R is 1 I[S«) – mx — b][1 + mf()] dx 1 + m?

> Find the Maclaurin series of f (by any method) and its radius of convergence. Graph f and its first few Taylor polynomials on the same screen. What do you notice about the relationship between these polynomials and f? f(x) = tan '(x³) S(x).

> Evaluate the integral. evi

> First make a substitution and then use integration by parts to evaluate the integral. ec sin 21 dt cos! Jo

> Now try b = 1 and a = n/d, a fraction where n and d have no common factor. First let n = 1 and try to determine graphically the effect of the denominator d on the shape of the graph. Then let n vary while keeping d constant. What happens when n = d + 1?

> Use a graphing device (or the interactive graphic in TEC Module 10.1B) to draw the graphs of hypocycloids with a positive integer and b = 1. How does the value of a affect the graph? Show that if we take a = 4, then the parametric equations of the hypocy

> (a) Every elementary function has an elementary derivative. (b) Every elementary function has an elementary antiderivative.

> Determine whether the sequence converges or diverges. If it converges, find the limit. n! 2"

> Find the Maclaurin series of f (by any method) and its radius of convergence. Graph f and its first few Taylor polynomials on the same screen. What do you notice about the relationship between these polynomials and f? f(a) — хе

> The Midpoint Rule is always more accurate than the Trapezoidal Rule.

> First make a substitution and then use integration by parts to evaluate the integral. 0° cos(0?) do Va/2

> Determine whether the statement is true or false. If it is true, explain why. If it is false, explain why or give an example that disproves the statement. Ldx = | In 15 Jo x?

> If y is the solution of the initial-value problem dy y 2y( 1 5 y(0) = 1 %3D dt then lim, y = 5.

> The function f(x) = (ln x)/x is a solution of the differential equation x2y’ + xy = 1.

> A hyperbola never intersects its directrix.

> Evaluate the integral. *2m t² sin 2t dt

> A tangent line to a parabola intersects the parabola only once.

> The graph of y2 = 2y + 3x is a parabola.

> Find the Maclaurin series of f (by any method) and its radius of convergence. Graph f and its first few Taylor polynomials on the same screen. What do you notice about the relationship between these polynomials and f? f(x) – In(1 + x²)

> First make a substitution and then use integration by parts to evaluate the integral. | cos(In x) dx

> The parametric equations x = t2, y = t4 have the same graph as x = t3, y = t6.

> If x = f(t) and y = t(t) are twice differentiable, then d²y _ d?y/dt² dx? d²x/dt² .2

> If the parametric curve x = f(t), y = g(t) satisfies g’(1) = 0, then it has a horizontal tangent when t = 1.

> Determine whether the sequence converges or diverges. If it converges, find the limit. an 3"7 " %3D

> Determine whether the sequence converges or diverges. If it converges, find the limit. a„ = 2 + (0.86)"

> Determine whether the sequence converges or diverges. If it converges, find the limit 3 + 5n? ,2 an n + n?

> First make a substitution and then use integration by parts to evaluate the integral. dx

> Find the Maclaurin series of f (by any method) and its radius of convergence. Graph f and its first few Taylor polynomials on the same screen. What do you notice about the relationship between these polynomials and f? f(x) = cos(x²) 2

> Find a formula for the general term an of the sequence, assuming that the pattern of the first few terms continues. {1, 0, – 1, 0, 1, 0, -1,0, .}

> Find a formula for the general term an of the sequence, assuming that the pattern of the first few terms continues. {5, 8, 11, 14, 17, . ..}

> Find a formula for the general term an of the sequence, assuming that the pattern of the first few terms continues. {-3, 2, –4. §, – 4. ..} 16 3 9

> Find a formula for the general term an of the sequence, assuming that the pattern of the first few terms continues. -1,; 16 64

> Determine whether the sequence converges or diverges. If it converges, find the limit. (In n)² an n

> Find a formula for the general term an of the sequence, assuming that the pattern of the first few terms continues. {平学学字} か. 111 l5ふる京而, } 4> 6 8 10

> List the first five terms of the sequence. 1 an (п + 1)!

> List the first five terms of the sequence. cos 2 An

> List the first five terms of the sequence. (-1)"-' an 5"

> List the first five terms of the sequence. – 1 ,2 an n2 + 1

> Evaluate the integral. e' sin(t – s) ds

> List the first five terms of the sequence. 2" an 2n + 1

> Use a Maclaurin series to obtain the Maclaurin series for the given function. - sin x if x + 0 f(x) = if x = 0 6.

> Suppose a curve is given by the parametric equations x = f(t), y = t(t), where the range of f is [1, 4] and the range of t is [2, 3]. What can you say about the curve?

> Evaluate the integral. · dx x² – 7 -2

> Determine whether the sequence converges or diverges. If it converges, find the limit. a, = In(2n² + 1) – In(n² + 1)

> Find an equation for the conic that satisfies the given conditions. Parabola, vertex (0, 0), focus (1, 0)

> Identify the type of conic section whose equation is given and find the vertices and foci. 4x* — у + 4

> Identify the type of conic section whose equation is given and find the vertices and foci. 4x? — у? + 4 .2

> Find an equation of the ellipse. Then find its foci. 2.

> Find an equation of the ellipse. Then find its foci. 1

> Evaluate the integral. | tan?x cos'x dx .3.

> Evaluate the integral. *2 x*(In x)° dx

> Evaluate the integral. ах dx x² – bx マ-

> Evaluate the integral. 3t – 2 -dt t + 1

1.99

See Answer