Solution Manual For Principles of Taxation for Business and Investment Planning 2024 27th
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Solution Manual For Principles of Taxation for Bu
Institution
Solution Manual For Principles Of Taxation For Bu
Solution Manual For Principles of Taxation for
Business and Investment Planning 2024 27th
Edition By Sally Jones, Shelley RhoadesCatanach, Callaghan, Kubick (All Chapters,
100% Original Verified, A+ Grade)
Find the right-sided Riemann Sum of sin(x^2) with n = 4, from [0, 4] - ANS-Right
S...
Solution Manual For Principles of Taxation for
Business and Investment Planning 2024 27th
Edition By Sally Jones, Shelley Rhoades-
Catanach, Callaghan, Kubick (All Chapters,
100% Original Verified, A+ Grade)
Find the right-sided Riemann Sum of sin(x^2) with n = 4, from [0, 4] - ANS-Right
S4 = (1)[sin(1^2) + sin(2^2) + sin(3^2) + sin(4^2)]
Right S4 = (1)[sin(1) + sin(4) + sin(9) + sin(16)]
Right S4 = .201
Find the midpoint Riemann Sum of sin(x^2) with
n = 4, from [0, 4] - ANS-Mid S4 = (1)[sin(.5^2) + sin(1.5^2) + sin(2.5^2) +
sin(3.5^2)]
Mid S4 = (1)[sin(.25) + sin(2.25) + sin(6.25) + sin(12.25)]
Mid S4 = .681
Find the left-sided Riemann Sum of ln(x^2) with n=2, from [1, 3] - ANS-Left S2 =
(1)[ln(1^2) + ln(2^2)]
Left S2 = (1)[ln(1) + ln(4)]
Left S2 = 1.386
Find the right-sided Riemann Sum of cos(x^2) with n = 3, from [2, 5] - ANS-Right
S3 = (1)[cos(3^2) + cos(4^2) + cos(5^2)]
Right S3 = (1)[cos(9) + cos(16) + cos(25)]
Right S3 = -.878
Approximate the area between the x-axis and h(x) = 1/(7-x) from x = 2 to x = 5
using a left Riemann sum with 3 equal subdivisions. - ANS-Area = (1)[h(2) +h(3)
+h(4)]
Area = (1)[1/5 +1/4 +1/3]
Area = 47/60
, Use the trapezoidal approximation for the integral of (sinx)^2dx from [0, 1] with n
= 4 to three decimal places. - ANS-Trapezoid = (1/2)(1/4)[(sin(0))^2
+2(sin(1/4))^2 +2(sin(1/2))^2 +2(sin(3/4))^2 +(sin(1))^2]
Trapezoid = .277
Find the midpoint Riemann Sum of cos(x^2) with n = 4, from [0, 2] - ANS-Mid S4
= (1)(1/2)[cos(.25^2) + cos(.75^2) + cos(1.25^2) + cos(1.75^2)]
Mid S4 = (1)(1/2)[cos(.625) + cos(.5625) + cos(1.5625) cos(3.0625)]
Mid S4 = .824
If the function f is continuous for all real numbers and if f(x) = (x^2-7x +12)/(x -4)
when x ≠ 4 then f(4) = - ANS-Factor numerator so
f(x) = (x-3)(x-4)/(x-4) = x-3
f(4)=4-3
f(4) = 1
If f(x) = (x^2+5) if x < 2, & f(x) = (7x -5) if x ≥ 2 for all real numbers x, which of
the following must be true?
I. f(x) is continuous everywhere.
II. f(x) is differentiable everywhere.
III. f(x) has a local minimum at x = 2. - ANS-At f(2) both the upper and lower
piece of the discontinuity is 9 so the function is continuous everywhere.
At f'(2) the upper piece is 4 and lower piece is 7 so f(x) is not differentiable
everywhere.
Since the slopes of the function on the left and right are both positive the
function cannot have a local minimum or maximum at x= 2.
Only I is true.
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