CS502 Midterm Online Quiz

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

For the heap sort, access to nodes involves simple _______________ operations.

Before sweeping a vertical line in plane sweep approach, in start sorting of the points is done in increasing order of their _______coordinates.

Divide-and-conquer as breaking the problem into a small number of

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

Which may be a stable sort?

Algorithm analysts know for sure about efficient solutions for NP-complete problems.

Sorting can be in _________

A RAM is an idealized machine with ______________ random-access memory.

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

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

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

The Knapsack problem belongs to the domain of _______________ problems.

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

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

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

For the Sieve Technique we take time

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.

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

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

Analysis of Selection algorithm ends up with,

Is it possible to sort without making comparisons?

Floor and ceiling are ____________ to calculate while analyzing algorithms.

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

Efficient algorithm requires less computational…….

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

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

For the Sieve Technique we take time

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

In selection algorithm, because we eliminate a constant fraction of the array with each phase, we get the

What is the total time to heapify?

Quick sort is

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

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

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

Algorithm is a mathematical entity, which is independent of a specific machine and operating system.

We cannot make any significant improvement in the running time which is better than that of brute-force algorithm.

Due to left complete nature of binary tree, the heap can be stored in

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.

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

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

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

In which order we can sort?

_______________ is a graphical representation of an algorithm

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

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

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

Sieve Technique can be applied to selection problem?

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

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.