CS502 Midterm Online Quiz

CS502-Midterm

1 / 50

Heaps can be stored in arrays without using any pointers; this is due to the ____________ nature of the binary tree,

tree nodes

left-complete

right-complete

tree leaves

2 / 50

One example of in place but not stable algorithm is

Merger Sort

Quick Sort

Continuation Sort

Bubble Sort

3 / 50

The definition of Theta-notation relies on proving ___________asymptotic bound.

Both lower & upper

One

Upper

Lower

4 / 50

For the worst-case running time analysis, the nested loop structure containing one “for” and one “while” loop, might be expressed as a pair of _________nested summations.

5 / 50

In addition to passing in the array itself to Merge Sort algorithm, we will pass in _________other arguments which are indices.

Five

Four

Three

Two

6 / 50

The analysis of Selection algorithm shows the total running time is indeed ________in n,

linear

geometric

arithmetic

orthogonal

7 / 50

Counting sort has time complexity:

O(nlogn)

O(n+k)

O(n)

O(k)

8 / 50

For the Sieve Technique we take time

T(n / 3)

n^2

n/3

T(nk)

9 / 50

In analysis, the Lower Bound means the function grows asymptotically at least as fast as its largest term.

TRUE

FALSE

10 / 50

Which sorting algorithm is faster

O n^3

O n^2

O (n+k)

O (n log n)

11 / 50

A RAM is an idealized algorithm with takes an infinitely large random-access memory.

TRUE

FALSE

12 / 50

In analysis of f (n) =n (n/5) +n-10 log n, f (n) is asymptotically equivalent to ________.

n+1

13 / 50

If we associate (x, y) integers pair to cars where x is the speed of the car and y is the negation of the price. High y value for a car means a ________ car.

Fast

Cheap

Expensive

Slow

14 / 50

What type of instructions Random Access Machine (RAM) can execute?

Parallel and recursive

Algebraic and logic

Arithmetic and logic

Geometric and arithmetic

15 / 50

Floor and ceiling are ____________ to calculate while analyzing algorithms.

Usually considered difficult

Very easy

16 / 50

In ____________ we have to find rank of an element from given input.

Merge sort algorithm

Selection problem

Plane Sweep algorithm

Brute force technique

17 / 50

Analysis of Selection algorithm ends up with,

T(1 / 1 + n)

T(n)

T(n / 2)

T((n / 2) + n)

18 / 50

Consider the following code:

For(j=1; j

For(k=1; k<15;k++)

For(l=5; l

{

Do_something_constant();

}

What is the order of execution for this code.

O(n2)

O(n3)

O(n)

O(n2 log n)

19 / 50

After sorting in merge sort algorithm, merging process is invoked.

FALSE

TRUE

20 / 50

Quick sort is

Some time stable & some times in place

Stable but not in place

Not stable but in place

Stable & in place

21 / 50

Upper bound requires that there exist positive constants c2 and n0 such that f(n) ____ c2n for all n <= n0(ye question ghalat lag raha hai mujhae

Less than

Equal to or Less than

Equal or Greater than

Greater than

22 / 50

The Knapsack problem belongs to the domain of _______________ problems.

NP Complete

Sorting

Linear Solution

Optimization

23 / 50

In Sieve Technique we do not know which item is of interest

TRUE

FALSE

24 / 50

In Heap Sort algorithm, the maximum levels an element can move upward is _________

Theta (log n)

O (1) i.e. Constant time

Omega (log n)

Order (log n)

25 / 50

An algorithm is a mathematical entity that is dependent on a specific programming language.

FALSE

TRUE

26 / 50

In 2d-space a point is said to be ________if it is not dominated by any other point in that space.

Minimal

Joint

Maximal

Member

27 / 50

Is it possible to sort without making comparisons?

No

Yes

28 / 50

Sorting can be in _________

Increasing order only

Both Increasing and Decreasing order

Random order

Decreasing order only

29 / 50

In Quick Sort Constants hidden in T(n log n) are

Medium

Small

Not Known

Large

30 / 50

In the analysis of Selection algorithm, we eliminate a constant fraction of the array with each phase; we get the convergent _______________ series in the analysis,

geometric

exponent

arithmetic

linear

31 / 50

The reason for introducing Sieve Technique algorithm is that it illustrates a very important special case of,

divide-and-conquer

greedy nature

2-dimension Maxima

decrease and conquer

32 / 50

What is the total time to heapify?

Ο(log2 n)

Ο(n2 log n)

Ο(log n)

Ο(n log n)

33 / 50

The sieve technique is a special case, where the number of sub problems is just

5

1

few

many

34 / 50

In Heap Sort algorithm, we build _______ for ascending sort.

Min heap

Max heap

35 / 50

The running time of quick sort depends heavily on the selection of

Arrangement of elements in array

No of inputs

Pivot elements

Size o elements

36 / 50

One of the clever aspects of heaps is that they can be stored in arrays without using any _______________.

constants

pointers

functions

variables

37 / 50

In Heap Sort algorithm, we build _______ for ascending sort.

Max heap

Min heap

38 / 50

In Heap Sort algorithm, if heap property is violated _________

We call Build heap procedure

Heap property can never be violated

We ignore

We call Heapify procedure

39 / 50

Efficient algorithm requires less computational…….

Memory and Running Time

Memory

Running Time

Energy

40 / 50

F (n) and g (n) are asymptotically equivalent. This means that they have essentially the same __________ for large n.

Size

Growth rates

Variables

Results

41 / 50

A heap is a left-complete binary tree that conforms to the ___________

heap order

(log n) order

increasing order only

decreasing order only

42 / 50

44.The running time of an algorithm would not depend upon the optimization by the compiler but that of an implementation of the algorithm would depend on it.

TRUE

FALSE

43 / 50

A point p in 2-dimensional space is usually given by its integer coordinate(s)____________

only p.x & p.z

p.x & p.y

p.x only p.y

44 / 50

A point p in 2-dimensional space is usually given by its integer coordinate(s)____________

p.x & p.z

p.y only

p.x only

p.x & p.y

45 / 50

Quick sort is based on divide and conquer paradigm; we divide the problem on base of pivot element and:

Merging the sub arrays

There is explicit combine process as well to conquer the solution.

None of above.

No work is needed to combine the sub-arrays, the array is already sorted

46 / 50

In RAM model instructions are executed

Parallel

Random

Concurrent

One after another

47 / 50

In Sieve Technique we do not know which item is of interest

TRUE

FALSE

48 / 50

_________ is one of the few problems, where provable lower bounds exist on how fast we can sort.

Sorting

Searching

Both Searching & Sorting

Graphing

49 / 50

One Example of in place but not stable sort is

Heap

Bubble

Quick

Merge

50 / 50

Asymptotic growth rate of the function is taken over_________ case running time.

Best

Worst

Normal

Average

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