CS502 Midterm Online Quiz

CS502-Midterm

1 / 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

Greater than

Equal or Greater than

2 / 50

The function f(n)= n(logn+1)/2 is asymptotically equivalent to n log n. Here Upper Bound means the function f(n) grows asymptotically ____________ faster than n log n.

Not

At least

Quiet

3 / 50

Counting sort has time complexity:

O(k)

O(n+k)

O(nlogn)

O(n)

4 / 50

Analysis of Selection algorithm ends up with,

T(n / 2)

T((n / 2) + n)

T(n)

T(1 / 1 + n)

5 / 50

Quick sort is

Not stable but in place

Some time stable & some times in place

Stable & in place

Stable but not in place

6 / 50

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

None of above.

Merging the sub arrays

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

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

7 / 50

Which sorting algorithm is faster

O n^2

O (n log n)

O (n+k)

O n^3

8 / 50

In which order we can sort?

decreasing order only

both at the same time

increasing order only

increasing order or decreasing order

9 / 50

The sieve technique works where we have to find _________ item(s) from a large input.

Three

Single

Two

Similar

10 / 50

Which may be a stable sort?

Merger

None of the above

Both above

Insertion

11 / 50

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

Not Known

Large

Small

Medium

12 / 50

The O-notation is used to state only the asymptotic ________bounds.

Two

Both lower & upper

Upper

Lower

13 / 50

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

FALSE

TRUE

14 / 50

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

p.x only p.y

only p.x & p.z

p.x & p.y

15 / 50

When we call heapify then at each level the comparison performed takes time

It can not be predicted

It will take Θ (1)

It will take Θ (log n)

Time will vary according to the nature of input data

16 / 50

For Chain Matrix Multiplication we can not use divide and conquer approach because,

We can easily perform it in linear time

Size of data is not given

We use divide and conquer for sorting only

We do not know the optimum k

17 / 50

In Quick sort, we don’t have the control over the sizes of recursive calls

Either true or false

TRUE

FALSE

Less information to decide

18 / 50

Algorithm is concerned with.......issues.

Both Macro & Micro

Macro

Micro

Normal

19 / 50

Cont sort is suitable to sort the elements in range 1 to k

K may be small or large

K is not known

K is small

K is Large

20 / 50

For the sieve technique we solve the problem,

accurately

recursively

mathematically

precisely

21 / 50

The Knapsack problem belongs to the domain of _______________ problems.

Sorting

Linear Solution

NP Complete

Optimization

22 / 50

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

Max heap

Min heap

23 / 50

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

Average

Best

Worst

Normal

24 / 50

The time assumed for each basic operation to execute on RAM model of computation is-----

Constant

Variable

Infinite

Continuous

25 / 50

Is it possible to sort without making comparisons?

Yes

26 / 50

Quick sort is best from the perspective of Locality of reference.

TRUE

FALSE

27 / 50

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

Three

Two

Five

Four

28 / 50

An in place sorting algorithm is one that uses ___ arrays for storage

None of the above

No Additional Array

More than one array

Two dimensional arrays

29 / 50

How many elements do we eliminate in each time for the Analysis of Selection algorithm?

2 n elements

(n / 2) elements

n / 4 elements

(n / 2)+n elements

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,

linear

arithmetic

exponent

geometric

31 / 50

A (an) _________ is a left-complete binary tree that conforms to the heap order

binary search tree

binary tree

heap

array

32 / 50

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

divide-and-conquer

decrease and conquer

2-dimension Maxima

greedy nature

33 / 50

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

Merge sort algorithm

Selection problem

Brute force technique

Plane Sweep algorithm

34 / 50

In the analysis of Selection algorithm, we make a number of passes, in fact it could be as many as,

log n

T(n / 2)

n / 2 + n / 4

T(n)

35 / 50

The number of nodes in a complete binary tree of height h is

2^(h+1) – 1

2 * (h+1)

((h+1) ^ 2) – 1

2 * (h+1) – 1

36 / 50

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

FALSE

TRUE

37 / 50

The ancient Roman politicians understood an important principle of good algorithm design that is plan-sweep algorithm.

FALSE

TRUE

38 / 50

The function f(n)=n(logn+1)/2 is asymptotically equivalent to nlog n. Here Lower Bound means function f(n) grows asymptotically at ____________ as fast as nlog n.

Normal

Most

All

Least

39 / 50

One Example of in place but not stable sort is

Bubble

Heap

Quick

Merge

40 / 50

In plane sweep approach, a vertical line is swept across the 2d-plane and _______structure is used for holding the maximal points lying to the left of the sweep line.

Queue

Stack

Array

Tree

41 / 50

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

Upper

Both lower & upper

Lower

One

42 / 50

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

Variables

Growth rates

Size

Results

43 / 50

The array to be sorted is not passed as argument to the merge sort algorithm.

TRUE

FALSE

44 / 50

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

Large

Small

Not Known

Medium

45 / 50

For the Sieve Technique we take time

T(n / 3)

T(nk)

n^2

n/3

46 / 50

One example of in place but not stable algorithm is

Bubble Sort

Quick Sort

Continuation Sort

Merger Sort

47 / 50

For small values of n, any algorithm is fast enough. Running time does become an issue when n gets large.

Fast

TRUE

48 / 50

The sieve technique works in ___________ as follows

Phases

integers

numbers

routines

49 / 50

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

TRUE

FALSE

50 / 50

What is the total time to heapify?

Ο(log n)

Ο(n2 log n)

Ο(n log n)

Ο(log2 n)

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The average score is 40%