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 :Where are you going ?Date:2019-12-11 15:25:21Done by:Anonymous user(Visitor)Updated ProfileDate:2019-12-11 15:21:49Done by:3avac1685wL1

Searching for :Name an advocate who pleads behalf of the accusedDate:2019-12-11 15:20:57Done by:Anonymous user(Visitor)

Career 2.0

You might be intrested on below oppertunities Show me All

Posted By:Eduladder

### Similar Questions

**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

**A random sample of size 100 is classified into 10 class intervals covering all the data points. To test whether the data comes from a normal population with unknown mean and unknown variance, the chi-squared goodness of fit test is used. The degrees of freedom of the test statistic is equal to ...**

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, ... , Xn be a random sample from normal distribution with mean μ and variance 1. Let Φ be the cumulative distribution function of the standard normal distribution. Given Φ(1.96) = 0.975, the minimum sample size required such that the length of the 95% confidence interval for μ does NOT exceed 2 is ...**

0 Answer

**A two - wheel drive tractor, while negotiating a terrain, indicates 100% slip of one of the rear wheels. Under such a condition, the use of differential lock causes. GATE- Agricultural Engineering- 2013**

1 Answer

**Let X1, ... , Xn be a random sample from uniform distribution defined over (0, θ), where θ > 0 and n ≥ 2. Let X(1) = min{X1, ... , Xn} and X(n) = max{X1, ... , Xn }. Then the covariance between X(n) and X(1)/ X(n) is**

0 Answer

**A tensile test is performed on a metallic specimen of diameter 8 mm and gauge length 50 mm. When the tensile load P reaches a value of 20 kN, the distance between the gauge marks increases by 0.09 mm. If the sample remains within the elastic limit, the modulus of elasticity (in GPa) of the test metal is………..[up to two decimal places]**

0 Answer

**Let X be a random variable following the binomial distribution. If E(X) = 2 and Var(X) = 1.2 , then P(X = 2) , accurate to three decimal places, is equal to ________. GATE-2018-General-Aptitude**

0 Answer

**In a slake durability test, mass of the drum with samples before the test and mass of the drum with oven-dried samples after the test are 1.52 kg and 1.48 kg respectively. If the mass of the drum is 1.05 kg, slake durability index in percentage (rounded off to two decimal places) is _________.**

0 Answer

**Which one of the following options presents the correct combination? (P) Reservoir limit test (I) Communication between wells (Q) Modified isochronal test (II) Ideally zero flowing bottom hole pressure (R) Interference test (III) Extended drawdown test (S) Absolute open flow potential (IV) Drawdown and build-up test of equal duration. Gate-2018-General-Aptitude**

1 Answer

**What test items should be put under configuration management?**

1 Answer

**In prioritising what to test, the most important objective is to:**

1 Answer

**A Germanium sample of dimensions 1 cm × 1 cm is illuminated with a 20 mW, 600 nm laser light source as shown in the figure. The illuminated sample surface has a 100 nm of loss-less Silicon dioxide layer that reflects one-fourth of the incident light. From the remaining light, one-third of the power is reflected from the Silicon dioxide- Germanium interface, one-third is absorbed in the Germanium layer, and one-third is transmitted through the other side of the sample. If the absorption coefficient of Germanium at 600 nm is 3 × 104 cm-1 and the bandgap is 0.66 eV, the thickness of the Germanium layer, rounded off to 3 decimal places, is ______ μm.**

0 Answer

**Standard error is (GATE-Biotechnology-2018)**

1 Answer

**During which fundamental test process activity do we determine if MORE tests are needed?**

1 Answer

**What is the purpose of test exit criteria in the test plan?**

1 Answer

**Test Implementation and execution has which of the following major tasks?**

1 Answer

**IEEE 829 test plan documentation standard contains all of the following except:**

1 Answer

**Which activity in the fundamental test process includes evaluation of the testability of the requirements and system?**

1 Answer

**Beach marks are commonly observed on the fractured surfaces of metals after a ________. (A) Creep test (B) Fatigue test (C) Impact test (D) Compression test**

1 Answer

### Notes

**CE2308 SOIL MECHANICS LABORATORY**

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

**Home Entrance Engineering GATE Graduate Aptitude Test... Sample paper Graduate Aptitude Test in Engineering (GATE) Comp. Sc. Sample Paper 10**

**CE2257 STRENGTH OF MATERIALS LABORATORY**

**CAPTCHA**

**GEOTECHNICAL LABORATORY EXPERIMENTS**

**BUSINESS MATHEMATICS AND ANALYTICS**

**ABB PAPER - 02 MAY 2004 - VADODARA**

**3I INFOTECH PATTERN & INTERVIEW - SEP 2007 - HYDERABAD**

**Graduate Aptitude Test in Engineering (GATE) Comp. Sc. Sample Paper 1**

## 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 ...

Solve the numerical with proper steps.Asked On2019-07-09 11:11:29 by:Jaynil-Gaglani

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