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Half Range Fourier Series contains either sine or cosine terms.
A
True
B
False
Correct Answer:
True
A series which contains only sine or cosine terms is called Half Range Fourier Sine Series or Cosine Series respectively.
The Fourier series of a real periodic function has only
P. Cosine terms if it is even
Q. Sine terms if it is even
R. Cosine terms if it is odd
S. Sine terms if it is odd
Which of the above statements are correct?
A
P and S
B
P and R
C
Q and S
D
Q and R
In Parseval’s relation of Half range Fourier cosine series expansion, which of the following terms doesn’t appear?
A
a0
B
an
C
bn
D
all terms appear
Let x(t) be a continuous time periodic signal with fundamental period T = 1 seconds. Let {a
k
} be the complex Fourier series coefficients of x(t), where k is integer valued. Consider the following statements about x(3t):
1. The complex Fourier series coefficients of x(3t) are {a
k
} where k is integer valued.
2. The complex Fourier series coefficients of x(3f) are {3a
k
} where k is integer valued.
3. The fundamental angular frequency of x(3t) is 6π rad/s.
For the three statements above, which one of the following is correct?
A
Only 2 and 3 are true
B
Only 1 and 3 are true
C
Only 3 is true
D
Only 1 is true
In half range cosine Fourier series, we assume the function to be _________
A
Odd function
B
Even function
C
Can’t be determined
D
Can be anything
A man sells chocolates which are in the boxes. Only either full box or half a box of chocolates can be purchased from him. A customer comes and buys half the number of boxes which the seller had plus half box more. A second customer comes and purchases half the remaining number of boxes plus half a box. After this the seller is left with no chocolate boxes. How many chocolate boxes the seller had initially?
A
2
B
3
C
4
D
3.5
E
None of these
Let x(t) be a periodic function with period T = 10. The Fourier series coefficients for this series are denoted by $${a_k}$$ , that is
$$x\left( t \right) = \sum\limits_{k = - \infty }^\infty {{a_k}{e^{jk{{2\pi } \over T}t}}} .$$
The same function x(t) can also be considered as a periodic function with period T' = 40. Let b
k
be the Fourier series coefficients when period is taken as T'. If $$\sum\limits_{k = - \infty }^\infty {\left| {{a_k}} \right|} = 16,$$ then $$\sum\limits_{k = - \infty }^\infty {\left| {{b_k}} \right|} $$ is equal to
A
256
B
64
C
16
D
4
Which of the following is true for the given statements about sine bars? Statement 1: Grade A sine bars are less accurate than grade B. Statement 2: Grade B sine bars are accurate up to 0.01 mm/m of length.
A
T, F
B
T, T
C
F, T
D
F, F
Computing the Fourier transform of the Laplacian result in spatial domain is equivalent to multiplying the F(u, v), Fourier transformed function of f(x, y) an input image of size M*N, and H(u, v), the filter used for implementing Laplacian in frequency domain. This dual relationship is expressed as Fourier transform pair notation given by_____________ F(u,v) b) ∇2 f(x,y)↔-F(u,v) c) ∇2 f(x,y)↔-F(u,v) d) ∇2 f(x,y)↔F(u,v)
A
∇2 f(x,y)↔F(u,v)
B
(u –M/2)2+ (v –N/2)2
C
(u –M/2)2+ (v –N/2)2
D
(u –M/2)2+ (v –N/2)2
A large tank of height h is half-filled with a liquid of density ρ and other half-filled with a liquid of density 4ρ. A similar tank is half-filled with a liquid of density 2ρ and other-half filled with another liquid of density 3ρ as shown. What will be the ratio of the instantaneous velocities of discharge through a small opening at the base of the tanks? (assume that the diameter of the opening is negligible compared to the height of the liquid column in either of the tanks)
A
1 : 1
B
1 : 2
C
2 : 1
D
1 : 3
A source has a cosine power pattern that is bidirectional. Given that the directivity of a unidirectional source with cosine power pattern has a directivity of 4, then the directivity of the unidirectional source is:
A
1
B
2
C
4
D
8