Note that since is not in domain so first two options are wrong
\n\n"},"encodingFormat":"text/html","position":3,"text":"For any fixed positive integer , "},"comment":{"@type":"Comment","text":"Recollect that: and use the method of difference for finding the sum of a series."},"eduQuestionType":"Checkbox","encodingFormat":"text/markdown","learningResourceType":"Practice problem","suggestedAnswer":[{"@type":"Answer","comment":{"@type":"Comment","text":"It is a wrong option."},"encodingFormat":"text/html","position":0,"text":""},{"@type":"Answer","comment":{"@type":"Comment","text":"It is a wrong option."},"encodingFormat":"text/html","position":1,"text":""},{"@type":"Answer","comment":{"@type":"Comment","text":"It is a wrong option."},"encodingFormat":"text/html","position":2,"text":"For any fixed positive integer ,"}],"text":"For any positive integer , define as for all .\n
Here, the inverse trigonometric function assumes values in
\n\n
Then, which of the following statement(s) is (are) TRUE?
\n"},"name":"Quiz on Inverse Trigonometric Functions","typicalAgeRange":"10-17","url":"https://www.embibe.com/questions/For-any-positive-integer-n%2C-define-fn%3A0%2C%C2%A0%E2%88%9E%E2%86%92R-as-fnx%3D%E2%88%91i%3D1ntan-111%2Bx%2Bjx%2Bj-1-for-all-x%E2%88%880%2C%E2%88%9E-.%0A%28Here%2C-the-inverse-trigonometric-function-tan-1%E2%81%A1x-assumes-values-in--%CF%802%2C%C2%A0%CF%802%29%0AThen%2C-which-of-the-following-statement%28s%29-is-%28are%29-TRUE%3F%0A/EM0306384"}
Embibe Experts Solutions for Chapter: Inverse Trigonometric Functions, Exercise 1: JEE Advanced Paper 2 - 2015
Author:Embibe Experts
Embibe Experts Mathematics Solutions for Exercise - Embibe Experts Solutions for Chapter: Inverse Trigonometric Functions, Exercise 1: JEE Advanced Paper 2 - 2015
Attempt the free practice questions on Chapter 12: Inverse Trigonometric Functions, Exercise 1: JEE Advanced Paper 2 - 2015 with hints and solutions to strengthen your understanding. EMBIBE CHAPTER WISE PREVIOUS YEAR PAPERS FOR MATHEMATICS solutions are prepared by Experienced Embibe Experts.
Questions from Embibe Experts Solutions for Chapter: Inverse Trigonometric Functions, Exercise 1: JEE Advanced Paper 2 - 2015 with Hints & Solutions