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Test: Minimal Covers - Computer Science Engineering (CSE) MCQ


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10 Questions MCQ Test Question Bank for GATE Computer Science Engineering - Test: Minimal Covers

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Test: Minimal Covers - Question 1

Which of the following is true for the below given functional dependencies of the relation R(X, Y,Z,W) and S(X, Y, Z, W)?
R: {X → Y, XY → Z, W → XZ, Z → W}
S: {X → YZ, W → XY}
I. R ⊇ S
II. S ⊇ R

Detailed Solution for Test: Minimal Covers - Question 1

Check: R ⊇ S
X+ = {Y, Z, E}
∴ X → YZ
W+ = {W, X, Z, Y}
W → XY
Hence R is covering S, that is, R ⊇ S
Check: S ⊇ R
X+ = {X, Y, Z}
∴ X → Y
(XY)+ = {X, Y, Z}
∴ XY → Z
W+ = {W, X, Y, Z}
∴ W → XZ
Z+ = {Z}
Z → W, it cannot be determined by S
and hence, S cannot cover R, that is, S ⊇ R is false
Only I is correct.

Test: Minimal Covers - Question 2

Let F be a set of functional dependencies given as
F = {A->BC, B->C, A->B, AB->C}
Find minimum cover for F

Detailed Solution for Test: Minimal Covers - Question 2

Initialization: {A->B, A->C,B->C,AB->C}
Consider A->B
G={A->C, B->C, AB->C}=G’ SINCE A->B ∉ G’, A->B STAYS
CONSIDER A->C
G={A->B, B->C, AB->C}=G’ SINCE A->B ∈ G’, A->C  REMOVED
CONSIDER B->C
G={A->B, AB->C}=G’ SINCE B->C ∉ G’, B->C STAYS
CONSIDER AB->C
G={A->B, B->C}=G’ SINCE AB->C ∈ G’, AB->C  REMOVED
THUS
G={A->B, B->C}

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Test: Minimal Covers - Question 3

Consider the following set of functional dependencies F on the schema S(P, Q, R)
F = {P → QR, PQ → R, Q → R, P → Q}
The canonical cover of the above given set is 

Detailed Solution for Test: Minimal Covers - Question 3

P+ = {P, Q, R}
It covers, P → QR, PQ → R and P → Q
Also, Q → R
It is also minimal
Therefore, P → Q and Q → R is the canonical cover of the above given set.

Test: Minimal Covers - Question 4

Which of the following is true given 2 schemes F & G
F : {A → BC, B → C, AC → B}
G : {AB → C, A → B, A → C}

Detailed Solution for Test: Minimal Covers - Question 4

i) Check for if F covers G :
checking FDs of F :-
{AB+} = {ABC}
{A+} = {ABC}
∴ F covers G
ii) check for it G covers F :
Cheeking FDs of G:-
{A+} = {ABC}
{B+} = {B} ⇒ B → C not covered
{AC+} = {ABC}
∴ G doesn’t covers F
Hence, a is the correct answer.

Test: Minimal Covers - Question 5

Assume that there are 4 attributes A, B, C, D and that F = {A→B, B →C}, then which of the following is not included in F+ ?

Detailed Solution for Test: Minimal Covers - Question 5

F+ will contain all of the above dependencies but ABC→D.

Test: Minimal Covers - Question 6

What is the canonical cover of the following set F of functional dependencies on the schema (A, B,C)?
A → BC 
B → C 
A → B
AB → C

Detailed Solution for Test: Minimal Covers - Question 6

There are two functional dependencies with the same set of attributes on the left side of the arrow:
A → BC
A → B
We can combine these functional dependencies into A → BC.
A is extraneous in AB → C. This is true because B → C is already there in the given set of functional dependencies. 
C is extraneous in A → BC because it is logically implied by A → B and B → C.
Thus, the canonical cover is:
A → B
B → C

Test: Minimal Covers - Question 7

What is the canonical cover for F?
F = A → BC, CD → E, B → D, E → A

Detailed Solution for Test: Minimal Covers - Question 7

There is no extraneous attribute in left hand side of FDs and the FDs cannot be reduced further.

Test: Minimal Covers - Question 8

Consider the following set of functional dependency on the schema (A, B,C)
A→BC, B→C, A→B, AB→C
The canonical cover for this set is:

Detailed Solution for Test: Minimal Covers - Question 8

All of the FDs are implied by the FDs {A->BC, B->C}
From option b: A= BC (hence A->BC, A->b and AB->Care implied by FDs set given in option b)
B= BC (hence B->C is implied by FDs set given in option b)

Test: Minimal Covers - Question 9

Consider the following set of functional dependencies on the relation (ABC), {A -> B, AB -> C, A -> BC, B-> C}. Find the canonical cover for the above FD set.

Detailed Solution for Test: Minimal Covers - Question 9

As, A -> BC =>  A -> B and A -> C so, the FD A -> B is redundant.
Similarly, B -> C can be implied by AB -> C.
So the canonical cover will be {A -> BC, AB ->C}

Test: Minimal Covers - Question 10

Find the minimal set of FDs.
R(A, B, C, D)
F : { A -> B, C -> B, D -> ABC, AC -> D}

Detailed Solution for Test: Minimal Covers - Question 10

C → B
A → B
AC → D
D → ABC
Given that, D → ABC

Case I:
B functionally dependent on  A so we replace
B to A
D → AAC
D → AC

Case II:
B functionally dependent on C, so we replace
B to C
D → ACC
D → AC

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