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Math iecep
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What is the Laplace Transform of a unit step function?
a. 1
b. s
c. 1 / s
d. u(t)
What is the Laplace transform of t?
a. 1 / s
b.1 / s2
c 1.
d. s
What is the Laplace transform of eat?
a. 1 / (s – a)
b. 1 / (s + a)
c. s + a
d. s – a
What is the Laplace transform of teat?
a. 1 / (s – a)2
b. 1 / (s – a )
c. (s + a)2
d. s – a
What is the Laplace transform of sin (wt)?
a. 1 / (s2 + w2)
b. 1 / (s2 - w2)
c. s / (s2 + w2)
d. s / (s2 - w2)
What is the Laplace transform of cos (wt)?
a. 1 / (s2 + w2)
b. 1 / (s2 - w2)
c. s / (s2 + w2)
d. s / (s2 - w2)
What is the Laplace transform of cosh (wt)?
a. 1 / (s2 + w2)
b. 1 / (s2 - w2)
c. s / (s2 + w2)
d. s / (s2 - w2)
What is the Laplace transform of sinh (wt)?
a. 1 / (s2 + w2)
b. 1 / (s2 - w2)
c. s / (s2 + w2)
d. s / (s2 - w2)
Given vectors A = i + j + k and B = 2i – 3j + 5k, find A∙B.
a. 2i -3j + 5k
b. 2i + 3j + 5k
c. 0
d. 4
Given vectors A = i + 2j and B = 3i – 2j + k, find the angle between them.
a. 0°
b. 36.575°
c. 96,865°
d. 127.352°
Φ = cos -1 ( A∙B) / (|A| |B|)
A∙ B = (1)(3) + (2)(-2) + (0)(1) = -1
|A| = sqrt (12+22) = sqrt(5)
|B| = sqrt (32 + (-2)2 + 12) = sqrt (14)
Φ = cos -1 ( -1) / (sqrt (5) x sqrt (14) )
Φ = 98.865°
Given vectors A = 4i + k and B = -2i + j + 3k, find AxB
a. 0
b. -8i + 3k
c. -12
d. i – 10j + 4k
AxB =
| |
AxB = i – 10j + 4k
Given a scalar function f (x, y , z), find the gradient of f.
a.
b.
c.
d.
Given a vector A = axi + ayj + azk, find the divergence of A.
a.
b.
c.
d.
Given a scalar function f (x, y , z), find the Laplacian of f.
a.
b.
c.
d.
Given a scalar function f (x, y , z), find the curl of the gradient of f
a. 1
b.
c. inf
d. 0
It is an equation that contains one or several derivatives of an unknown
function called y(x) and which we want to determine from the equation.
a. homogeneous differential equation
b. ordinary differential equation
c. partial differential equation
d. linear constant coefficient differential equation
Solve the differential equation y’ = 1 + y2
a. y = tan -1 (x) + c
b. y = tan (x) + c
c. y = tan (x + c)
d. y = tan (x)
Solve the initial value problem y ‘ = -y / x, where y(1) = 1
a. y = c / x
b. y = x / c
c. y = x
d. y = 1 / x
A ______ is a collection of objects, and these objects are called the
elements.
a. set
b.subset
c.venn diagram
d.union
Solve the equation √
a.1
b.-1
c.1 / 4
d. – 1 / 4
Find the y-intercept of the graph
a. 0
b. 1.7
c.-2
d. No answer because only lineaf function have y-intercept
Given the equation , find its symmetry.
a. symmetric with respect to x-axis
b. symmetric with respect to y-axis
c. symmetric with respect to the origin
d.all of the above
The charge in coulombs that passes through a wire after t seconds is
given by the function Q(t) = t3 − 2t2 + 5t + 2. Determine the average
current during the first two seconds.
a. 2 amperes
b. 3 amperes
c. 4 amperes
d. 5 amperes
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Two sides of a triangle are 5 and 10 inches, respectively. The angle
between them is increasing at the rate of 5◦ per minute. How fast is the
third side of the triangle growing when the angle is 60deg?
a. 5π/6 in/m
b. 5π/36 in/m
c. 6π/25 in/m
d. 6π/5 in/m
Two cars begin a trip from the same point P. If car A travels north at the
rate of 30 mi/h and car B travels west at the rate of 40 mi/h, how fast is the
distance between them changing 2 hours later?
a. 20 mi/h
b. 30 mi/h
c. 40 mi/h
d. 50 mi/h
A baseball diamond is a square whose sides are 90 ft long. If a batter hits
a ball and runs to first base at the rate of 20 ft/sec, how fast is his distance
from second base changing when he has run 50 ft?
a.
√
b.
√
c.
√
d.
√
Postal regulations require that the sum of the length and girth of a
rectangular package may not exceed 108 inches (the girth is the perimeter
of an end of the box). What is the maximum volume of a package with
square ends that meets this criteria?
a. 11,646 in3
b. 11,466 in3
c. 11,464 in3
d. 11,664 in3
The graphs of the equations of the forms r = asinnϴ and r = acosnϴ
where n is a positive integer, greater than 1, are called _____.
a. Lemniscates
b. Rose Curves
c. Cardioids
d. Limacons
The graph of an equation of the form r = b + asinϴ or r = b + acosϴ is
called a ________.
a. Lemniscates
b. Rose Curves
c. Cardioids
d. Limacons
A/n ______ is the set of all points P in a plane such that the sum of the
distances of P from two fixed points F and G of the plane is constant.
a. Ellipse
b. Circle
c. Conic
d. Parabola
Any differential equation of the form y= px + f(p) where f(p) contains
neither x nor y explicitly is called a/n _______.
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a. Bernoulli’s Equation
b. Clairaut’s Equation
c. Homogenous Equation
d. Laguerre Polynomials
These variables are dimensionless combinations of the physical variable
and parameters of the original.
a. Canonical Variables
b. Dependent Variables
c. X and Y Variables
d. Controlled Variables
This states that every integral rational equation has at least one root.
a. Fundamental Theorem of Arithmetic
b. Fundamental Theorem of Counting
c. Fundamental Theorem of Algebra
d. Fundamental Theorem of Equations
The logarithm of the reciprocal of a number is called _____.
a. Inverse Logarithm
b. Cologarithm
c. Index
d. Briggsian Logarithm
Given the equation: { } { } where L-1 is the
inverse Laplace transform of a function f(s). Find x
a. e-at
b. eat
c. a-et
d. aet
Solve the initial value problem
a.
b.
c.
d.
Taking the Laplace transform of the DE
Find the first derivative of uv.
a.
b.
c.
d.
( )
If , determine ∫ .
a. ln 0.5
b. ln 2
c. ln 3
d. ln 1.5
∫ | | | | | | |
Evaluate: ∫
a.
b.
c.
d.
Simplify: ( )
a. Tan-1 1/7
b. Tan-1 1/6
c. -Tan-1 1/7
d. -Tan-1 1/6
How many different signals, each consisting of 6 flags hung in a vertical
line, can be formed from 4 identical red flags and 2 identical blue flags?
a. 15
b. 672
c. 720
d. 34560
This is a case of permutations of indistinguishable objects
Three light bulbs are chosen at random from 15 bulbs from which 5 are
defective. Find the probability that one light bulb drawn is defective.
a.
b.
c.
d.
This is a case of hypergeometric probability distribution.
A point is selected at random inside a circle. Find the probability that the
point is closer to the center than to its circumference.
a. ¼
b. ½
c. 1/3
d. 1
For the circle given, draw a concentric circle with a radius half of the
radius of the given circle. A point that lies on the inner circle is closer to
the center of the original circle than to its circumference.
For the probability, we have:
( )
Consider the series Sn =1 -1 +1 -1 +1 + -… If n is even, the sum is zero
and if n is odd, the sum is 1. What do you call this kind of infinite series?
a. Oscillating series
b. Geometric series
c. Bilateral Series
d. Di-valued Series
Find the mean deviation for the following set of data: {35,40, 45}
a. 10/3 b. 5 c. 25 d. 5/3
∑ | |
| | | | | |
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Compute the standard deviation for {54, 57, 59, 59, 60, 61, 61, 62, 62, 62,
63, 64, 65, 65, 66, 66, 66, 66, 67, 67, 68, 68, 68, 68, 68, 69, 69, 69, 70,
71, 71, 72, 72, 73, 75, 75, 77, 79, 81, 83, 90}
a. 50.41 b. 7.1 c. 68 d. 8.6
√ ∑
√
Meiko King travels 100 miles at the rate of 30 mph and then on a free way
travels the next 100 miles at the rate of 55 mph. What is her average
speed?
a. 38.8 mph b. 42.5 mph c. 45.2 mph d. 48.8 mph
Meiko’s average speed is the Harmonic mean of 30 mph and 55 mph
Find the quadratic mean of {1.3, 1.5, 1.7, 1.0, 1.1}
a. 9.04 b. 1.1 c. 1.8 d. 1.34
√
Find the probability of obtaining an ace on both the first and second draws
from a deck of cards when the first is not replaced before the second is
drawn.
a. 1/256 b. 1/17 c. 1/21 d. 1/221
P1P2 = (5/42)(3/51) = 1/221
The probability of throwing at least 3 aces in 5 throws of a die.
a. 8/243 b. 23/648 c. 125/3888 d. 126/3888
5C3 p3q2 + 5C4 p4q + p5 = 10(1/6)3(5/6)2 + 5(1/6)4(5/6) + (1/6)5 = 23/648
Find the probability of throwing at least 2 aces in 10 throws of a die
a. 0.484 b. 0.333 c. 0.515 d. 0.238
The probability of 0 or 1 aces is
(5/6)10 + 10(5/6)9(1/6) = 9762625/20155392
The probability of throwing at least 2 aces is
1 - 9762625/20155392 = 10389767/20155392 = 0.5154832513
Two cards are drawn at random from a standard deck of 52 cards. What is
the probability that both are hearts?
a. 13/52 b. 1/17 c. 7/13 d. 7/26
P(two hearts) =
A collection of 15 transistors contains 3 that are defective. If 2 transistors
are selected at random, what is the probability that at least 1 of them is
good?
a. 1/35 b. 1/5 c. 34/35 d. 4/5
Thus, the probability of selecting at least one good transistor is 1 -1/35 =
34/35
What are the odds of getting 2 ones in a single throw of a pair of dice?
a. 25 to 36 b. 35 to 36 c. 1 to 36 d. 1 to 35
There are 6x6 or 36 possible outcomes when throwing two dice
P(s) = 1/36 P(f) = 1 – 1/36 = 35/36
Odds = P(s)/(P(f) = (1/36) / (35/36) = 1/35
Find the probability of getting a sum of 7 on the first of two dice and a sum
of 4 on the second throw.
a. 1/72 b. 1/6 c. 11/36 d. 6/36
Let A be a sum of 7 on the first throw. Let B be a sum of 4 on the second
throw.
P(A) = 6/36 P(B) = 3/36
P(A and B) = P(A).P(B) = (6/36)(3/36) = 1/72
A new phone is being installed at the Steiner residence. Find the
probability that the final three digits in the telephone number will be even.
a. 1/8 b. 1/4 c. 1/2 d. 3/8
P(any digit being even) = 5/10 or ½
P(final three being even) = (1/2)(1/2)(1/2) = 1/8
There are 5 red, 3 blue, and 7 black marbles in a bag. Three marbles are
chosen without replacement. Find the probability of selecting a red one,
then a blue one, and then a red one.
a. 2/91 b. 1/5 c. 2/225 d. 1/26
P(red, blue, and red) = (5/15)(3/14)(4/13) = 2/91
Find the probability of a sum of 6 or a sum of 9 on a single throw of two
dice.
a. 1/4 b. 5/324 c. 5/9 d. 15/36
P(sum of 6) = 5/36 P(sum of 9) = 4/36
P(sum of 6 or sum of 9) = 5/36 + 4/36 = 9/36 = 1/4
What is the probability of drawing a king or a black card?
a. 15/25 b. 7/13 c. 1/2 d. 6/13
King black black king black or king
4/52 + 26/52 - 2/52 = 28/52 or 7/14
A committee of 5 people is to be selected from a group of 6 men and 7
women. What is the probability that the committee will have at least 3
men?
a. 59/143 b. 140/429 c. 84/145 d. 37/429
P(at least 3 men) = P(3 men) + P(4 men) + (5 men)
= 140/429 + 35/429 + 2/429 = 177/429 = 59/143
Suppose that three dice are thrown at the same time. Find the probability
that at least one 4 will show.
a. 1/216 b. 91/216 c. 25/36 d. 1/12
P(at least one 4) = p43 + 3p42q4 + 3p4q42 + q43
= (1/6)3 + 3(1/6)2(5/6) + 3(1/6)(5/6)2
=91/216
Peggy guesses on all 10 questions on a true-false quiz. What is the
probability that exactly half of the answers are correct?
a. 1/2 b. 1/32 c. 1/8 d. 63/256
C(10,5) T5F5 =
Find the median of the following set of data: {4,10,1,6}
a. 4 b. 10 c. 7 d. 5.25
The median is the mean of the two middle values.
{1, 4, 10, 61}
Thus,
A pair of dice is thrown. Find the probability that their sum is greater than
7 given that the numbers are match.
a. 6/36 b. 3/36 c. 1/2 d. 1/11
P(B) = 6/36 P(A and B) = 3/36
P(A/B) =