In eduladder you can Ask,Answer,Listen,Earn and Download Questions and Question papers.

Watch related videos of your favorite subject.

Connect with students from different parts of the world.

Apply or Post Jobs, Courses ,Internships and Volunteering opportunity. For FREE

See Our team

Wondering how we keep quality?

Got unsolved questions? Ask Questions

GATE
GMAT
CBSE
NCERT
Career
Interview
Railway
UPSC
NID
NIFT-UG
NIFT-PG
PHP
AJAX
JavaScript
Node Js
Shell Script
Research

New updates

Searching for :CBSEDate:2019-11-23 00:11:28Done by:Anonymous user(Visitor)Searching for :CBSEDate:2019-11-23 00:09:28Done by:Anonymous user(Visitor)

Searching for :GMATDate:2019-11-23 00:05:57Done by:Anonymous user(Visitor)

Career 2.0

You might be intrested on below oppertunities Show me All

### Similar Questions

**Two numbers are chosen independently and uniformly at random from the set {1, 2 , . . . , 13}. The probability (rounded off to 3 decimal places) that their 4-bit (unsigned) binary representations have the same most significant bit is ___________.**

0 Answer

**Let T be a full binary tree with 8 leaves. (A full binary tree has every level full.) Suppose two leaves a and b of T are chosen uniformly and independently at random. The expected value of the distance between a and b in T (i.e., the number of edges in the unique path between a and b) is (rounded off to 2 decimal places)**

1 Answer

**An array of 25 distinct elements is to be sorted using quicksort. Assume that the pivot element is chosen uniformly at random. The probability that the pivot element gets placed in the worst possible location in the first round of partitioning (rounded off to 2 decimal places) is ________.**

2 Answer

**A random variable X takes values −1 and +1 with probabilities 0.2 and 0.8, respectively. It is transmitted across a channel which adds noise N, so that the random variable at the channel output is Y = X + N. The noise N is independent of X, and is uniformly distributed over the interval [−2 , 2]. The receiver makes a decision X̂ = { −1, if Y ≤ θ +1, ifY > θ where the threshold θ ∈ [−1,1] is chosen so as to minimize the probability of error Pr[X̂ ≠ X]. The minimum probability of error, rounded off to 1 decimal place, is ___________.**

0 Answer

**Consider the unsigned 8-bit fixed point binary number representation below, b7 b6 b5 b4 b3 . b2 b1 b0 where the position of the binary point is between b3 and b2. Assume b7 is the most significant bit. Some of the decimal numbers listed below cannot be represented exactly in the above representation: (i) 31.500 (ii) 0.875 (iii) 12.100 (iv) 3.001**

0 Answer

**Two people, P and Q, decide to independently roll two identical dice, each with 6 faces, numbered 1 to 6. The person with the lower number wins. In case of a tie, they roll the dice repeatedly until there is no tie. Define a trial as a throw of the dice by P and Q. Assume that all 6 numbers on each dice are equi-probable and that all trials are independent. The probability (rounded to 3 decimal places) that one of them wins on the third trial is _____.**

1 Answer

**Two cards are drawn at random and without replacement from a pack of 52 playing cards. The probability that both the cards are black (rounded off to three decimal places) is __________.**

0 Answer

**A letter of a English alphabet is chosen at random, Determine the probability that the chosen letter is a consonant. Mathematics CBSE class 10 2015**

1 Answer

**Suppose Y is distributed uniformly in the open interval (1,6). The probability that the polynomial 3x ^2 + 6xY + 3Y + 6 has only real roots is (rounded off to 1 decimal place)**

0 Answer

**An integer is chosen at random between 1 and 100. Find the probability that it is : (i) divisible by 8. (ii) not divisible by 8. Mathematics-CBSE-class-10**

1 Answer

**The probability of solving a problem by Student A is (1/3), and the probability of solving the same problem by Student B is (2/5). The probability (rounded off to two decimal places) that at least one of the students solves the problem is _______________.**

1 Answer

**A number x is selected at random from the numbers 1 , 2, 3 and 4. Another number y is selected at random from the numbers 1, 4, 9 and 16. Find the probability that product of x and y is less than 16. CBSE Mathematics**

1 Answer

**Two unbiased dice are thrown. Each dice can show any number between 1 and 6. The probability that the sum of the outcomes of the two dice is divisible by 4 is________ (rounded off to two decimal places).**

1 Answer

**Let X1 and X2 be independent geometric random variables with the same probability mass function given by P(X = k) = p(1 − p) k−1 , k = 1, 2, . . .. Then the value of P(X1 = 2|X1 + X2 = 4) correct up to three decimal places is (Gate 2018 engineering mathematics))**

0 Answer

**Let a random process Y(t) be described as Y(t) = h(t) ∗ X(t) + Z(t), where X(t) is a white noise process with power spectral density SX(f) = 5 W/Hz. The filter h(t) has a magnitude response given by |H(f)| = 0.5 for −5 ≤ f ≤ 5, and zero elsewhere. Z(t) is a stationary random process, uncorrelated with X(t), with power spectral density as shown in the figure. The power in Y(t), in watts, is equal to ________ W (rounded off to two decimal places).**

0 Answer

**Let X1 be a random sample of size 1 from uniform distribution over (θ, θ 2 ), where θ > 1. To test H0: θ = 2 against H1: θ = 3, reject H0 if and only if X1 > 3.5 . Let α and β be the size and the power, respectively, of this test. Then α + β (rounded off to two decimal places) is equal to ...**

0 Answer

**Two cards are chosen at random from a deck of 52 playing cards. What is the probability that both of them have the same value?**

0 Answer

**C onsider the following C code. Assume that unsigned long int type length is 64 bits. unsigned long int fun(unsigned long int n){ unsigned long int i, j = 0, sum = 0; for (i = n; i > 1; i = i/2) j++; for ( ; j > 1; j = j/2) sum++; return(sum); } The value returned when we call fun with the input 240 is**

1 Answer

**The random variable X has probability density function as given by**

0 Answer

**Consider the random process X(t)= U +Vt, where U is a zero-mean Gaussian random variable and V is a random variable uniformly distributed between 0 and 2.**

1 Answer

### Notes

**STOCHASTIC MODELS AND APPLICATIONS 10CS665**

**Design and Analysis of Algorithms Subject Code : 10CSL47 Lab Manual PROGRAM-1**

**Design and Analysis of Algorithms Subject Code : 10CSL47 Lab Manual PROGRAM-2**

**System stimulation and modeling [10mca52] question Bank**

**BUSINESS MATHEMATICS AND ANALYTICS**

**Creating icons from scratch**

**cg project2**

**JAVA AND J2EE[10CS753] Notes unit-1**

**Econ 500: Quantitative Methods in Economic Analysis I iowa**

**Economics 571: Intermediate Econometrics**

## Two numbers are chosen independently and uniformly at random from the set {1, 2 , . . . , 13}. The probability (rounded off to 3 decimal places) that their 4-bit (unsigned) binary representations have the same most significant bit is ___________.

Asked On2019-07-08 11:47:59 by:Gaganpreet-Gandhi

Taged users:

Likes:

Be first to like this question

Dislikes:

Be first to dislike this question

Talk about this Like Dislike

Download question setAnswersNot yet answerdThis question has not found any answer yet! If you know the answer for this question please help us to find an answer.Please read

How to post an answer on eduladder

Lets together make the web is a better placeWe made eduladder by keeping the ideology of building a supermarket of all the educational material available under one roof. We are doing it with the help of individual contributors like you, interns and employees. So the resources you are looking for can be easily available and accessible also with the freedom of remix reuse and reshare our content under the terms of creative commons license with attribution required close.

You can also contribute to our vision of "Helping student to pass any exams"with these.Answer a question:You can answer the questions not yet answered in eduladder.How to answer a questionCareer:Work or do your internship with us.Work with usCreate a video:You can teach anything and everything each video should be less than five minutes should cover the idea less than five min.How to upload a video on eduladder