This is the list of answer key for ISI MStat PSA Portion. Enjoy.
This is the list of answer key for ISI MStat PSA Portion. Enjoy.
Math Kangaroo Competition is an International Mathematical Competition for kids of graded 1 to 12. It is also known as : "International Mathematical Kangaroo" or "Kangourou sans frontières" in French. This competition focus on the logical ability of the kids rather than their grip on learning Math formulas. Some Interesting Facts on Math Kangaroo: How […]
From the path of falling in love with data and chance. to an examination ISI MStat program is different and unique. We discuss that how ISI MStat program is something more than an exam. We will also discuss how to prepare for the exam.
Are you ready for IIT JAM MS 2022? Check it out with a Free Diagnostic Test prepared by Cheenta Statistics & Analytics Department! Other Useful Resources for You
Let us learn about Stirling Numbers of First Kind. Watch video and try the problems related to Math Olympiad Combinatorics
Suppose $r\geq 2$ is an integer, and let $m_{1},n_{1},m_{2},n_{2} \cdots ,m_{r},n_{r}$ be $2r$ integers such that$$|m_{i}n_{j}−m_{j}n_{i}|=1$$for any two integers $i$ and $j$ satisfying $1\leq i <j <r$. Determine the maximum possible value of $r$. Solution: Let us consider the case for $r =2$. Then $|m_{1}n_{2} - m_{2}n_{1}| =1$.......(1) Let us take $m_{1} =1, n_{2} =1, m_{2} =0, n_{1} =0$. Then, clearly the condition holds for $r =2$. […]
Suppose we have a triangle $ABC$. Let us extend the sides $BA$ and $BC$. We will draw the incircle of this triangle. How to draw the incircle? Here is the construction. Draw any two angle bisectors, say of angle $A$ and angle $B$ Mark the intersection point $I$. Drop a perpendicular line from I to […]
This year Cheenta Statistics Department has done a survey on the scores in each of the sections along with the total score in IIT JAM MS. Here is the secret for you! We have normalized the score to understand in terms of percentage. There are three questions, we ask The general performance for the IIT […]
Here are the problems and their corresponding solutions from B.Math Hons Objective Admission Test 2008. Problem 1 : Let $a, b$ and $c$ be fixed positive real numbers. Let $u_{n}=\frac{n^{2} a}{b+n^{2} c}$ for $n \geq 1$. Then as $n$ increases, (A) $u_{n}$ increases;(B) $u_{n}$ decreases;(C) $u_{n}$ increases first and then decreases;(D) none of the above […]
Here are the problems and their corresponding solutions from B.Math Hons Objective Admission Test 2007. Problem 1 : The number of ways of going up $7$ steps if we take one or two steps at a time is (A) $19$ ;(B) $20$;(C) $21$ ;(D) $22$ . Problem 2 : Consider the surface defined by $x^{2}+2 […]
Access Australian Mathematics Competition past year paper of 2020 year 11 - 12 Senior to sharpen your problem-solving skills.
Access Australian Mathematics Competition past year paper of 2023 year 11 - 12 Senior to sharpen your problem-solving skills.
Access Australian Mathematics Competition past year paper of 2021 year 11 - 12 Senior to sharpen your problem-solving skills.
Dive into the discussion of the solution to Problem 27 from the year 2021 Australian Mathematics Competition, Intermediate category.
Dive into the discussion of the solution to the Australian Mathematics Competition(AMC), Upper Primary Problem 16 from the year 2022.
Dive into the discussion of the solution to the Australian Mathematics Competition(AMC), Upper Primary Problem 17 from the year 2023.
Dive into the discussion of the solution to Problem 29 from the year 2023 Australian Mathematics Competition, Junior category.
Have a look at the Questions and Solutions of Australian Mathematics Competition 2023 - Intermediate of Grade 9 and 10.
Have a look at the Questions and Solutions of Australian Mathematics Competition 2022 - Intermediate of Grade 9 and 10.
Have a look at the Questions and Solutions of Australian Mathematics Competition 2021 - Intermediate of Grade 9 and 10.