Phase 3 (Pre-JEE Main, 6 months before): Solve only the “Archives” and “Competitive Edge” sections of relevant chapters. Time yourself.
The series for IIT JEE has long been a staple in the arsenal of aspirants aiming for top ranks in the Indian Institutes of Technology (IITs) . Known for its rigorous problem sets and concise conceptual summaries, the series is designed to help students transition from basic school-level math to the highly competitive level required for both JEE Main and JEE Advanced . Core Offerings for JEE Aspirants tata mcgraw hill mathematics for iit jee
If $\alpha, \beta$ are roots of $x^2 - 3x + 4 = 0$, then the value of $\alpha^3 + \beta^3 + \frac1\alpha^3 + \frac1\beta^3$ is equal to: (A) 0 (B) $63/64$ (C) $-63/64$ (D) 1 Phase 3 (Pre-JEE Main, 6 months before): Solve
The number of ways in which 5 boys and 3 girls can be seated in a row so that no two girls sit together is divisible by 144. If the number of ways is $N$, find the value of $N/144$. Known for its rigorous problem sets and concise
Hint: Roots of $f'(x)=3x^2-12x+11=0$ are distinct real (Disc > 0). Max/Min at roots. $f'(x)$ roots are $2 \pm \frac1\sqrt3$.
The primary author, , is a name that needs no introduction. His pedagogical approach—building from absolute basics to intricate problem-solving—has defined a generation. For the Tata McGraw Hill IIT JEE edition, the editorial team often includes contributions from Dr. D. P. Apte and other subject matter experts from top coaching institutes. This collaboration ensures that the content is not merely a rehash of school syllabus theory but is aligned with the shifting trends of the JEE (e.g., inclusion of more application-based and multi-concept problems).