Aspire's Library

A Place for Latest Exam wise Questions, Videos, Previous Year Papers,
Study Stuff for MCA Examinations
  • CUET
    Previous Year Questions

CUET Previous Year Questions (PYQs)

CUET Logarithms And Indices PYQ

CUET PYQ
List I List II
A. Kailash Satyarthi I. Chemistry
B. Abhijit Banerjee II. Peace
C. Vinkatraman Ramakrishnan III. Physics
D. Subrahmanyan Chandrasekhar IV. Economics






Go to Discussion
CUET Previous Year PYQ CUET CUET 2023 PYQ

Solution

List I List II
A. Kailash Satyarthi II. Peace
B. Abhijit Banerjee IV. Economics
C. Venkatraman Ramakrishnan I. Chemistry
D. Subrahmanyan Chandrasekhar III. Physics
CUET PYQ
The value of $; e^{\log 10 \tan 1^\circ + \log 10 \tan 2^\circ + \log 10 \tan 3^\circ + \cdots + \log 10 \tan 89^\circ} ;$ is





Go to Discussion
CUET Previous Year PYQ CUET CUET 2023 PYQ

Solution

Using property: $\log a + \log b = \log(ab)$ So expression becomes: $e^{\log 10 \left(\tan 1^\circ \tan 2^\circ \cdots \tan 89^\circ\right)}$ Using identity: $\tan \theta \tan (90^\circ-\theta) = 1$ All terms cancel pairwise: $\tan 1^\circ \tan 89^\circ \cdot \tan 2^\circ \tan 88^\circ \cdots = 1$ Thus exponent becomes $\log 10 (1)=0$ So value $= e^0 = 1$
CUET PYQ
Math List I with List II : $\omega \ne1$ is a cube root of unity.
 LIST I LIST II
A. $\log _4(\log _3(81))=$I. 0 
B. ${3}^{4\log _9(7)}={7}^k$, then k =II. 3 
C. ${2}^{\log _3(5)}-{5}^{\log _3(2)}=$ III. 1
D. $\log _2[\log _2(256)]=$IV. 2
Choose the correct answer from the options given below:





Go to Discussion
CUET Previous Year PYQ CUET CUET 2022 PYQ

Solution


CUET

Online Test Series,
Information About Examination,
Syllabus, Notification
and More.

Click Here to
View More

CUET

Online Test Series,
Information About Examination,
Syllabus, Notification
and More.

Click Here to
View More
Limited Seats
× Aspire MCA Promotion

Game Changer NIMCET Test Series 2026

Boost your preparation with mock tests, analysis and rank-focused practice.

JOIN NOW
Ask Your Question or Put Your Review.

loading...