2.99 See Answer

Question: Evaluate the following integrals. ∫ (3 cos 3x -


Evaluate the following integrals.
∫ (3 cos 3x - 2 sin 2x) dx


> Find all points (x, y) where f (x, y) has a possible relative maximum or minimum. f (x, y) = 4x2 + 4xy - 3y2 + 4y - 1

> Find all points (x, y) where f (x, y) has a possible relative maximum or minimum. f (x, y) = 3x2 + 8xy - 3y2 - 2x + 4y - 1

> Find all points (x, y) where f (x, y) has a possible relative maximum or minimum. f (x, y) = -3x2 + 7xy - 4y2 + x + y

> Find all points (x, y) where f (x, y) has a possible relative maximum or minimum. f (x, y) = x2 - 5xy + 6y2 + 3x - 2y + 4

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = ex/(1 + ey)

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = (2x - y + 5)2

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = 1/(x + y)

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = x/y + y/x

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = x exy

> Let f (x, y) = xy. Show that f (2, 3 + k) - f (2, 3) = 2k.

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = 2x2ey

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = x2 - y2

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = 5xy

> The productivity of a country is given by f (x, y) = 300x2/3y1/3, where x and y are the amount of labor and capital. (a) Compute the marginal productivities of labor and capital when x = 125 and y = 64. (b) Use part (a) to determine the approximate effec

> A farmer can produce f (x, y) = 200 √(6x2 + y2) units of produce by utilizing x units of labor and y units of capital. (The capital is used to rent or purchase land, materials, and equipment.) (a) Calculate the marginal productivities of labor and capita

> Let f (x, y) = xey + x4y + y3. Find ∂2f/∂x2, ∂2f/∂y2, ∂2f/∂x∂y, and ∂2f/∂y∂x.

> Let f (x, y) = x3y + 2xy2. Find ∂2f/∂x2, ∂2f/∂y2, ∂2f/∂x∂y, and ∂2f/∂y∂x.

> Let f (x, y) = x/(y – 6). Compute ∂f/∂y (2, 1) and interpret your result.

> Let f (x, y) = xy2 + 5. Evaluate ∂f/∂y at (x, y) = (2, -1) and interpret your result.

> Let f (x, y) = (x + y2)3. Evaluate ∂f/∂x and ∂f/∂y at (x, y) = (1, 2).

> Let f (x, y) = xy. Show that f (2 + h, 3) - f (2, 3) = 3h.

> Let f (x, y) = x2 + 2xy + y2 + 3x + 5y. Find ∂f/∂x (2, -3) and ∂f/∂x (2, -3).

> Let f (x, y, z) = xy/z. Find ∂f/∂x, ∂f/∂y, and ∂f/∂z.

> Construct angles with the following radian measure. -π

> Determine the radian measure of the angle shown.

> Determine the radian measure of the angle shown.

> Determine the radian measure of the angle shown.

> Evaluate the given integral. ∫0 π/4 (2 + 2 tan2 x) dx

> Let f (x, y, z) = xz eyz. Find ∂f/∂x, ∂f/∂y, and ∂f/∂z.

> Evaluate the given integral. ∫0 π/4 tan2 x dx

> Evaluate the given integral. ∫ (2 + tan2 x) dx

> Evaluate the given integral. ∫ (1 + tan2 x) dx

> Evaluate the given integral. ∫ tan2 3x dx

> Evaluate the given integral. ∫ tan2 x dx

> Find the average of the function f (t) over the given interval. f (t) = cos t + sin t, - π ≤ t ≤ 0

> Find the average of the function f (t) over the given interval. f (t) = 1000 + 200 sin 2 (t - π /4), 0 ≤ t ≤ 3 π /4

> Find the average of the function f (t) over the given interval. f (t) = t - cos 2t, 0 ≤ t ≤ π

> Find the average of the function f (t) over the given interval. f (t) = 1 + sin 2t – 1/3 cos 2t, 0 ≤ t ≤ 2π

> In Fig. 2: Find the shaded area A4. Figure 2: 1 Y 0 A₁ cosx TU2 A3 sin x X

> Let f (x, y, z) = zex/y. Find ∂f/∂x, ∂f/∂y, and ∂f/∂z.

> In Fig. 2: Find the shaded area A3. Figure 2: 1 Y 0 A₁ cosx TU2 A3 sin x X

> In Fig. 2: Find the shaded area A2. Figure 2: 1 Y 0 A₁ cosx TU2 A3 sin x X

> In Fig. 2: Find the shaded area A1. Figure 2: 1 Y 0 A₁ cosx TU2 A3 sin x X

> Evaluate the following integrals. ∫ 2 sec2 2x dx

> Evaluate the following integrals. ∫ sec2 x/2 dx

> Evaluate the following integrals. ∫-π π (cos 3x + 2 sin 7x) dx

> Evaluate the following integrals. ∫0 π (x - 2 cos (π - 2x))

> Evaluate the following integrals. ∫ cos (6 - 2x) dx

> Evaluate the following integrals. ∫0 π /2 cos 6x dx

> Let f (x, y, z) = (1 + x2y)/z. Find ∂f/∂x, ∂f/∂y, and ∂f/∂z.

> Evaluate the following integrals. ∫ sin (π - x) dx

> A spirogram is a device that records on a graph the volume of air in a person’s lungs as a function of time. If a person undergoes spontaneous hyperventilation, the spirogram trace will closely approximate a sine curve. A typical trace

> A spirogram is a device that records on a graph the volume of air in a person’s lungs as a function of time. If a person undergoes spontaneous hyperventilation, the spirogram trace will closely approximate a sine curve. A typical trace

> A spirogram is a device that records on a graph the volume of air in a person’s lungs as a function of time. If a person undergoes spontaneous hyperventilation, the spirogram trace will closely approximate a sine curve. A typical trace

> Find the area of the region bounded by the curves y = x and y = sin x from x = 0 to x = π.

> Find the area of the region between the curve y = cos t and the t-axis from t = 0 to t = 3π/2.

> Find the area of the region between the curve y = sin t and the t-axis from t = 0 to t = 2π.

> Find the area under the curve y = 2 + sin 3t from t = 0 to t = π/2.

> Sketch the graph of y = t + sin t for 0 ≤ t ≤ 2π.

> Find the equation of the line tangent to the graph of y = tan t at t = π/4.

> Let f (p, q) = 1 - p(1 + q). Find ∂f/∂q and ∂f/∂p.

> The identity sin (s + t) = sin s cos t + cos s sin t was given in Section 8.2. Compute the partial derivative of each side with respect to t, and obtain an identity involving cos (s + t).

> If f (s, t) = t sin st, find ∂f/∂s and ∂f/∂t.

> If z = sin wt, find ∂z/∂w and ∂z/∂t.

> If f (s, t) = sin s cos 2t, find ∂f/∂s and ∂f/∂t.

> Show that y = 3 sin 2t + cos 2t satisfies the differential equation y’’ = -4y.

> If f (t) = sin2 t, find f ‘(t).

> f (t) = et tan t

> f (t) = etan t

> Differentiate (with respect to t or x): f (t) = tan 2t / cos t

> Differentiate (with respect to t or x): f (t) = sin t / tan 3t

> Let f (L, K) = 3√(LK). Find ∂f/∂L.

> Differentiate (with respect to t or x): y = sin4 e3x

> Differentiate (with respect to t or x): y = e3x sin4 x

> Differentiate (with respect to t or x): y = ln (cos x)

> Differentiate (with respect to t or x): y = ln (sin x)

> Differentiate (with respect to t or x): y = ln x cos x

> Differentiate (with respect to t or x): y = sin x tan x

> Differentiate (with respect to t or x): y = tan (sin x)

> Differentiate (with respect to t or x): y = sin (tan x)

> Differentiate (with respect to t or x): y = tan e-2x

> Differentiate (with respect to t or x): y = tan (x4 + x2)

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = √(x2 + y2)

> Differentiate (with respect to t or x): f (x) = tan3 2x

> Differentiate (with respect to t or x): f (x) = cos3 4x

> Differentiate (with respect to t or x): f (x) = (cos x – 1) / x3

> Differentiate (with respect to t or x): f (x) = cos 2x / sin 3x

> Differentiate (with respect to t or x): g(x) = sin(-2x) cos 5x

> Differentiate (with respect to t or x): g(x) = x3 sin x

> Differentiate (with respect to t or x): f (t) = cos t3

> Differentiate (with respect to t or x): f (t) = sin√t

> Differentiate (with respect to t or x): f (t) = sin 3t

> Differentiate (with respect to t or x): f (t) = 3 sin t

> Find ∂f/∂x and ∂f/∂y for each of the following functions. f (x, y) = (x – y)/(x + y)

> Determining the height of a Tree A tree casts a 60-foot shadow when the angle of elevation of the sun (measured from the horizontal) is 53˚. How tall is the tree?

> Geometry of a roof A gabled roof is to be built on a house that is 30 feet wide so that the roof rises at a pitch of 23˚. Determine the length of the rafters needed to support the roof.

> When π /2 < t < π, is sin t positive or negative?

> When – π/2 < t < 0, is tan t positive or negative?

> Find the four values of t between -2π and 2π at which sin t = -cos t.

> Find the four values of t between -2π and 2π at which sin t = cos t.

2.99

See Answer