Mathematics | ECE Electronics and Communication Engineering | TANCET Anna University Online Objective Test

TANCET Anna University ECE Electronics and Communication Engineering # Mathematics Three Dimensional Geometry Prepare / Learn

Q1. In the Cartesian form two lines

\frac{x - x_{1}}{a_{1}} = \frac{y - y_{1}}{b_{1}} = \frac{z - z_{1}}{c_{1}}

and

\frac{x - x_{2}}{a_{2}} = \frac{y - y_{2}}{b_{2}} = \frac{z - z_{2}}{c_{2}}

are coplanar if

Answer : Option D
Explaination / Solution:

In the Cartesian form two lines

\frac{x - x_{1}}{a_{1}} = \frac{y - y_{1}}{b_{1}} = \frac{z - z_{1}}{c_{1}}

and

\frac{x - x_{2}}{a_{2}} = \frac{y - y_{2}}{b_{2}} = \frac{z - z_{2}}{c_{2}}

are coplanar if

TANCET Anna University ECE Electronics and Communication Engineering # Mathematics Differential Equations Prepare / Learn

Q2. Forming a differential equation representing the given family of curves by eliminating arbitrary constants a and b from

\frac{x}{a} + \frac{y}{b} = 1

yields the differential equation

A. y″ = y

B. y'' = 0

C. y′′=y3

D. y″ = 2y

Answer : Option B
Explaination / Solution:

TANCET Anna University ECE Electronics and Communication Engineering # Mathematics Complex Numbers and Quadratic Equations Prepare / Learn

Q3. The value of

{(\frac{1 + ω}{ω^{2}})}^{3}

A. 1

B. 0

C. None of these

D. -1

Answer : Option D
Explaination / Solution:

TANCET Anna University ECE Electronics and Communication Engineering # Mathematics Binomial Theorem Prepare / Learn

Q4.

If the coefficients of 2nd ,3rd and 4th terms in the expansion of $(1 + x)^{n}$ are in A.P. then

A. n2−5n+14=0

B. n2−9n+14=0

C. n2−9n+18=0

D. n2−6n+12=0

Answer : Option B
Explaination / Solution:

TANCET Anna University ECE Electronics and Communication Engineering # Mathematics Maths Sets Prepare / Learn

Q5. If Q = { x : = 1/y , where y ∈ N } , then

A. 1/2

\notin

B. 0

\in

C. 2

\in

D. 1 ∈ Q

\in

Answer : Option D
Explaination / Solution:

N is set of natural number,so

x = 1/y

when y=1 then x=1

1 $\in$ Q

TANCET Anna University ECE Electronics and Communication Engineering # Mathematics Limits and Derivatives Prepare / Learn

Q6.

\frac{d}{d x} (\sin^{- 1} (1 - x))

is equal to

A. −12x−x2√

B. 1x2−2x√

C. 12x−x2√

Answer : Option D
Explaination / Solution:

TANCET Anna University ECE Electronics and Communication Engineering # Mathematics Linear Programming Prepare / Learn

Q7. A cottage industry manufactures pedestal lamps and wooden shades, each requiring the use of a grinding/cutting machine and a sprayer. It takes 2 hours on grinding/cutting machine and 3 hours on the sprayer to manufacture a pedestal lamp. It takes 1 hour on the grinding/cutting machine and 2 hours on the sprayer to manufacture a shade. On any day, the sprayer is available for at the most 20 hours and the grinding/cutting machine for at the most 12 hours. The profit from the sale of a lamp is Rs 5 and that from a shade is Rs 3. Assuming that the manufacturer can sell all the lamps and shades that he produces, how should he schedule his daily production in order to maximize his profit?

A. 5 Pedestal lamps and 5 wooden shades; Maximum profit = Rs 38

B. 4 Pedestal lamps and 5 wooden shades; Maximum profit = Rs 36

C. 5 Pedestal lamps and 4 wooden shades; Maximum profit = Rs 35

D. 4 Pedestal lamps and 4 wooden shades; Maximum profit = Rs 32

Answer : Option D
Explaination / Solution:

Let number of pedestal lamps manufactured = x
And number of wooden shades manufactured = y
Therefore , the above L.P.P. is given as :
Maximise , Z = 5x +3y , subject to the constraints : 2x +y ≤ 12 and. 3x +2y ≤ 20 , x, y ≥ 0.

Corner points	Z =5x +3 y
O( 0 , 0 )	0
D(6,0 )	30
A(0,10)	30
B(4,4)	32…………………(Max.)

Here Z = 32 is maximum.
i.e 30 packages of screws A and 20 packages of screws B; Maximum profit = Rs 410.
i.e. 4 Pedestal lamps and 4 wooden shades; Maximum profit = Rs 32 .

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