Pascal's Triangle How to get value of 11^5 from Pascal Triangle Blaise Pascal (19 June 1623 – 19 August 1662) was a French mathematician, physicist, inventor, writer and Christian philosopher. Pascal Triangle is really a great work by Pascal & open many options for scholars in mathematics. Pascal’s triangle is a triangular array of the binomial coefficients. It is based on x,

Factorial Function A note on the Factorial Function Write down 0,1,2,3,4,5 and put parallely square of each number like 0,1,4,9,16,25, then start to subtract the bigger one to the lower one (1–0),(4–1),(9–4),(16–9) and (25–16) to get 1,3,5,7,

AP A theorem on right angled triangles Theorem: In a Right-Angled Triangle with sides in A.P. Series, the distance between the point of intersection of median & altitude at the base is 1/10th the sum of other two sides. This Theorem applies in Two Conditions: 1. The Triangle must be Right-Angled. 2. Its Sides are in

Calculation Tricks A new method of squaring and cubing Below we demonstrate a simple method to find nth power of a number. Here we’ll take examples to find Square & Cube of a number through Points marked on 2 faces & 3 faces of a Triangular Pyramid respectively. Firstly, we are finding cube of a number. 1. We take 3

Squaring Square through Sqaures A new formula is derived by Piyush Kumar Goyal known as “Square Through Squares”. Formula is mention below: N2 = [(N-2)th Sq. on Y-Axis] * [3rd Sq. on X-Axis] + [(N-3)th Sq. on Y-Axis] * [(N-3)th Sq. on X-Axis] Let’s take some examples: 1. Square of 5 52 = [(5-2)th

Amazing Numbers Amazing Number Nine IT IS VERY INTERESTING TAKE ANY NUMBER OF DIGITS. HERE I AM TAKING 25 AND 32 * YOU CAN WRITE THEM IN FOUR WAYS LIKE THAT(25*32/25*23/52*23/52*32) 25*32=800 25*23=575 52*23=1196 52*32=1664 * SUBTRACT BIGGER ONE TO ANY