Calculus MCQs Question and Answer in Engineering Maths Page-5 section-1

41.
The polynomial p(x) = x⁵ + x + 2 has

A. all real roots

B. 3 real and 2 complex roots

C. 1 real and 4 complex roots

D. all complex roots

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42.
A function y = 5x² + 10x is defined over an open interval x = (1, 2). At least at one point in this interval, $$\frac{{{\text{dy}}}}{{{\text{dx}}}}$$ is exactly

A. 20

B. 25

C. 30

D. 35

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43.
Let x and y be two vectors in a 3 dimensional space and <x, y> denote their dot product. Then the determinant det \[\left[ {\begin{array}{*{20}{c}} { < {\text{x}},{\text{x}} > }&{ < {\text{x}},{\text{y}} > } \\ { < {\text{y}},{\text{x}} > }&{ < {\text{y}},{\text{y}} > } \end{array}} \right].\]

A. is zero when x and y are linearly independent

B. is positive when x and yare linearly independent

C. is non-zero for all non-zero x and y

D. is zero only when either x or y is zero

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44.
$$\mathop {{\text{Lim}}}\limits_{{\text{x}} \to \infty } \left( {\frac{{{\text{x}} + \sin {\text{x}}}}{{\text{x}}}} \right)$$ equal to

A. $$ - \infty $$

B. 0

C. 1

D. $$\infty $$

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45.
For a vector E, which one of the following statements is NOT TRUE?

A. If $$\nabla $$ · E = 0, E is called solenoidal

B. If $$\nabla $$ × E = 0, E is called conservative

C. If $$\nabla $$ × E = 0, E is called irrotational

D. If $$\nabla $$ · E = 0, E is called irrotational

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46.
Which one of the following functions is continuous at x = 3?

A. \[{\text{f}}\left( {\text{x}} \right) = \left\{ {\begin{array}{*{20}{c}} {2,}&{{\text{if}}}&{{\text{x}} = 3} \\ {{\text{x}} - 1,}&{{\text{if}}}&{{\text{x}} > 3} \\ {\frac{{{\text{x}} + 3}}{3},}&{{\text{if}}}&{{\text{x}} < 3} \end{array}} \right.\]

B. \[{\text{f}}\left( {\text{x}} \right) = \left\{ {\begin{array}{*{20}{c}} {4,}&{{\text{if}}}&{{\text{x}} = 3} \\ {8 - {\text{x,}}}&{{\text{if}}}&{{\text{x}} \ne 3} \end{array}} \right.\]

C. \[{\text{f}}\left( {\text{x}} \right) = \left\{ {\begin{array}{*{20}{c}} {{\text{x}} + 3,}&{{\text{if}}}&{{\text{x}} \leqslant 3} \\ {{\text{x}} - 4,}&{{\text{if}}}&{{\text{x}} > 3} \end{array}} \right.\]

D. $${\text{f}}\left( {\text{x}} \right) = \frac{1}{{{{\text{x}}^3} - 27}},\,{\text{if}}\,{\text{x}} \ne 3$$

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47.
If A(0, 4, 3), B(0, 0, 0) and C(3, 0, 4) are three points defined in x, y, zeo-ordinate system, then which of the following vector is perpendicular to both vectors \[\overrightarrow {{\text{AB}}} \] and \[\overrightarrow {{\rm{BC}}} .\]

A. \[16{\rm{\hat i}} + 9{\rm{\hat j}} - 12{\rm{\hat k}}\]

B. \[16{\rm{\hat i}} - 9{\rm{\hat j}} + 12{\rm{\hat k}}\]

C. \[16{\rm{\hat i}} - 9{\rm{\hat j}} - 12{\rm{\hat k}}\]

D. \[16{\rm{\hat i}} + 9{\rm{\hat j}} + 12{\rm{\hat k}}\]

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48.
A function f(x) is defined as
\[{\text{f}}\left( {\text{x}} \right) = \left\{ {\begin{array}{*{20}{c}} {{{\text{e}}^x}}&{{\text{x}} < 1} \\ {\ln {\text{x}} + {\text{a}}{{\text{x}}^2} + {\text{bx}},}&{{\text{x}} \geqslant 1} \end{array}} \right.\]
where x\[ \in \] R which one of the following statements is TRUE?

A. f(x) is NOT differentiable at x = 1 for any values of a and b

B. f(x) is differentiable at x = 1 for the unique values of a and b

C. f(x) is differentiable at x = 1 for all the values of a and b such that a + b = e

D. f(x) is differentiable at x = 1 for all values of a and b

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49.
The inner (dot) product of two non zero vectors \[\overrightarrow {\text{P}} \] and \[\overrightarrow {\text{Q}} \] is zero. The angle (degrees) between the two vectors is

A. 0

B. 30

C. 90

D. 120

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50.
Let f(x) = e^{x + x²} for real x. From among the following, choose the Taylor series approximation of f(x) around x = 0, which includes all powers of x less than or equal to 3,

A. 1 + x + x² + x³

B. 1 + x + \[\frac{3}{2}\]x² + x³

C. 1 + x + \[\frac{3}{2}\]x² + \[\frac{7}{6}\]x³

D. 1 + x + 3x² + 7x³

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Calculus MCQs Question and Answer in Engineering Maths

41. The polynomial p(x) = x5 + x + 2 has

Answer & Solution

42. A function y = 5x2 + 10x is defined over an open interval x = (1, 2). At least at one point in this interval, $$\frac{{{\text{dy}}}}{{{\text{dx}}}}$$ is exactly

Answer & Solution

43. Let x and y be two vectors in a 3 dimensional space and <x, y> denote their dot product. Then the determinant det \[\left[ {\begin{array}{*{20}{c}} { < {\text{x}},{\text{x}} > }&{ < {\text{x}},{\text{y}} > } \\ { < {\text{y}},{\text{x}} > }&{ < {\text{y}},{\text{y}} > } \end{array}} \right].\]

Answer & Solution

44. $$\mathop {{\text{Lim}}}\limits_{{\text{x}} \to \infty } \left( {\frac{{{\text{x}} + \sin {\text{x}}}}{{\text{x}}}} \right)$$ equal to

Answer & Solution

45. For a vector E, which one of the following statements is NOT TRUE?

Answer & Solution

46. Which one of the following functions is continuous at x = 3?

Answer & Solution

47. If A(0, 4, 3), B(0, 0, 0) and C(3, 0, 4) are three points defined in x, y, zeo-ordinate system, then which of the following vector is perpendicular to both vectors \[\overrightarrow {{\text{AB}}} \] and \[\overrightarrow {{\rm{BC}}} .\]

Answer & Solution

Answer & Solution

49. The inner (dot) product of two non zero vectors \[\overrightarrow {\text{P}} \] and \[\overrightarrow {\text{Q}} \] is zero. The angle (degrees) between the two vectors is

Answer & Solution

50. Let f(x) = ex + x2 for real x. From among the following, choose the Taylor series approximation of f(x) around x = 0, which includes all powers of x less than or equal to 3,

Answer & Solution

Read More Section(Calculus)

41.
The polynomial p(x) = x⁵ + x + 2 has

42.
A function y = 5x² + 10x is defined over an open interval x = (1, 2). At least at one point in this interval, $$\frac{{{\text{dy}}}}{{{\text{dx}}}}$$ is exactly

43.
Let x and y be two vectors in a 3 dimensional space and <x, y> denote their dot product. Then the determinant det \[\left[ {\begin{array}{*{20}{c}} { < {\text{x}},{\text{x}} > }&{ < {\text{x}},{\text{y}} > } \\ { < {\text{y}},{\text{x}} > }&{ < {\text{y}},{\text{y}} > } \end{array}} \right].\]

44.
$$\mathop {{\text{Lim}}}\limits_{{\text{x}} \to \infty } \left( {\frac{{{\text{x}} + \sin {\text{x}}}}{{\text{x}}}} \right)$$ equal to

45.
For a vector E, which one of the following statements is NOT TRUE?

46.
Which one of the following functions is continuous at x = 3?

47.
If A(0, 4, 3), B(0, 0, 0) and C(3, 0, 4) are three points defined in x, y, zeo-ordinate system, then which of the following vector is perpendicular to both vectors \[\overrightarrow {{\text{AB}}} \] and \[\overrightarrow {{\rm{BC}}} .\]

49.
The inner (dot) product of two non zero vectors \[\overrightarrow {\text{P}} \] and \[\overrightarrow {\text{Q}} \] is zero. The angle (degrees) between the two vectors is

50.
Let f(x) = e^{x + x²} for real x. From among the following, choose the Taylor series approximation of f(x) around x = 0, which includes all powers of x less than or equal to 3,