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SOLUTIONS MANUAL for Control Systems Engineering 7th Edition by Norman Nise. ISBN 9781118800638 $17.99
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SOLUTIONS MANUAL for Control Systems Engineering 7th Edition by Norman Nise. ISBN 9781118800638
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SOLUTIONS MANUAL for Control Systems Engineering 7th Edition by Norman Nise. ISBN 9781118800638 Trapezoid = 31.516 Use the trapezoid rule with n = 4 to approximate the area between the curve f(x) = x^3 -x and the x-axis from x = 3 to x =7ANS-Trapezoid = (1/2)(1)[(3^3 -3) +2(4^3 -4) +2(5^...

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  • February 14, 2024
  • 9
  • 2023/2024
  • Exam (elaborations)
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  • solutions manual for control systems engineering
  • manual for control systems engineering
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SOLUTIONS MANUAL for
Control Systems Engineering
7th Edition by Norman Nise.
ISBN 9781118800638
Trapezoid = 31.516

Use the trapezoid rule with n = 4 to approximate the area between
the curve f(x) = x^3 -x and the x-axis from x = 3 to x =7ANS-Trapezoid
= (1/2)(1)[(3^3 -3) +2(4^3 -4) +2(5^3 -5) +2(6^3 -6) +(7^3 -7)]

Trapezoid = 570

Use the trapezoid rule with n = 4 to approximate the area between
the curve f(x) = x^2 + 1 and the x-axis from x = 3 to x =7ANS-
Trapezoid = (1/2)(1)[(3^2 +1) +2(4^2 +1) +2(5^2 +1) +2(6^2 +1) +(7^2
+1)]

Trapezoid = 110

Use the trapezoid rule with n = 6 to approximate the area between
the curve f(x) = 3x^3 - 4 and the x-axis from x = 0 to x =6ANS-
Trapezoid = (1/2)(1)[(3(0^3) - 4) + 2(3(1^3) - 4) + 2(3(2^3) - 4) +
2(3(3^3) - 4) + 2(3(4^3) - 4) + 2(3(5^3) - 4) + (3(6^3) - 4)]

Trapezoid = 975

Use the trapezoid rule with n = 4 to approximate the area between
the curve f(x) = 2x^3 - 1 and the x-axis from x = 2 to x =6ANS-
Trapezoid = (1/2)(1)[(2(2^3)-1) +2(2(3^3)-1) +2(2(4^3)-1) +(2(5^3)-1)
+(2(6^3)-1)]

, Trapezoid = 527.5

Find the area of the polar equation
r = 4cos θANS-A = (1/2) ∫(4cos θ)^2dθ from [0, 2pi]

plug into calculator

A = 8pi + 8sin(pi)

Find the area inside the first curve R = 2 + sin θ and outside the
second curve r = 3sin θANS-Find the positions of intersection by
setting the equations equal to each other and solving for θ.



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.

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