Engineering Mathematics Miscellaneous Easy Questions and Answers | Page - 2

Engineering Mathematics Miscellaneous

The best approximation of the minimum value attained by e^–x sin (100 x) for x > 0 is ______.

1. 0.9844
1. 1.9844
1. 11.91844
1. None of these

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f(x) = e^{– x} sin(100x)
f '(x) = – e^{– x}sin(100x) + e^{– x}cos(100x) × 100
for minima f '(x) = 0
tan(100 x) = 100
x = 1 tan^-1(100) = 0.0156
100

f(x) = e^{– 0.0156} sin(100 × 0.0156) = 0.9844

Correct Option: A

f(x) = e^{– x} sin(100x)
f '(x) = – e^{– x}sin(100x) + e^{– x}cos(100x) × 100
for minima f '(x) = 0
tan(100 x) = 100
x = 1 tan^-1(100) = 0.0156
100

f(x) = e^{– 0.0156} sin(100 × 0.0156) = 0.9844

Consider a spatial curve in three-dimensional space given in parametric form by x(t) = cos t, y(t) = sin t,
z(t) = 2 t , 0 ≤ t ≤ π The length of the curve is ___________.
π 2

1. 0.8622
1. 1.8622
1. 11.8622
1. 1.81622

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The length of the curve

= 1.8622

Correct Option: B

The length of the curve

= 1.8622

The area enclosed between the parabola y = x² and the straight line y = x is

1. 1
  8
1. 1
  6
1. 1
  3
1. 1
  2

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Given equations are
y = x² ...(i)
y = x ...(ii)
From equations (i) and (ii)
x ² – x = 0
⇒ x(x – 1) = 0
⇒ x = 0, 1

Area enclosed = dydx = ∫¹_{x = 0} dx ∫^{y = x²}_{_{y = x}} dy

= [y]^{y = x²}_{_{y = x}} dx = (x² - x) dx

= x³ - x² ¹
3 2 ₀

= 1 - 1 = 2 - 3 = - 1
3 2 6 6

Correct Option: B

Given equations are
y = x² ...(i)
y = x ...(ii)
From equations (i) and (ii)
x ² – x = 0
⇒ x(x – 1) = 0
⇒ x = 0, 1

Area enclosed = dydx = ∫¹_{x = 0} dx ∫^{y = x²}_{_{y = x}} dy

= [y]^{y = x²}_{_{y = x}} dx = (x² - x) dx

= x³ - x² ¹
3 2 ₀

= 1 - 1 = 2 - 3 = - 1
3 2 6 6

Consider the shaded triangular region P shown in the figure. What is ∬_{_P} xy dxdy ?

1. 1
  6
1. 2
  9
1. 7
  16
1. 1

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I = ∬ xy .dxdy
The limit of y is from 0 to
and limit of x from 0 to 2.

= x 1 - x ² dx
2 2

= 1 x(x² + 4 - 4x).dx
8

= 1 (x³ + 4x - 4x²).dx
8

Correct Option: A

I = ∬ xy .dxdy
The limit of y is from 0 to
and limit of x from 0 to 2.

= x 1 - x ² dx
2 2

= 1 x(x² + 4 - 4x).dx
8

= 1 (x³ + 4x - 4x²).dx
8

The right circular cone of largest volume that can be enclosed by a sphere of 1 m radius has a height of

1. 1 m
  3
1. 2 m
  3
1. 2√2 m
  3
1. 4 m
  3

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Given R = 1, radins of sphere.
Let height of cone is H = h + R
Volume , V = 1 π × (√R² - h²)²(R + h)
3

for maximum value ,
⇒ dV = 0
dh

⇒ d 1 (R² - h²)(R + h)
dh 3

⇒ -2h(R + h) + (R² - h²) = 0
⇒ (R + h)(R - 3h) = 0
h = -R , R
3

Height of the come = R + R = 4R
3 3

= 4 × 1 m = 4 m
3 3

Correct Option: D

Given R = 1, radins of sphere.
Let height of cone is H = h + R
Volume , V = 1 π × (√R² - h²)²(R + h)
3

for maximum value ,
⇒ dV = 0
dh

⇒ d 1 (R² - h²)(R + h)
dh 3

⇒ -2h(R + h) + (R² - h²) = 0
⇒ (R + h)(R - 3h) = 0
h = -R , R
3

Height of the come = R + R = 4R
3 3

= 4 × 1 m = 4 m
3 3