Pascal's Triangle is an illustration of the coefficients of a binomial expansion. (There are also other patterns within the triangle, but it is primarily taught in relation to binomial expansion.) Each row begins and ends with the number one. The elements in each row are the sum of the two numbers above it in the previous row and continues indefinitely: 1 1 1 1 2 1 1 3 3 1 1 4 6 4 1
It is spelled Pascual's triangle, and it looks like this:11 11 2 11 3 3 11 4 6 4 11 5 10 10 5 1Basis of the Binomial Theorem as well as many other important mathematical functions.
#include#includevoid main(){int n,a=1,s=1,r;printf("\n enter number of lines ");cin>>n;for(;a=1;b--){printf(" ");}r=pow(s,2);printf("\n");a++;}getch();}// \m/
any triangle is a triangle
If a triangle is obtuse, the orthocenter of the triangle actually lies outside of the triangle. If the triangle is acute, the orthocenter of the triangle lies on the inside of the triangle
Yes, a scalene triangle can be a triangle.
A triangle can be constructed into any of the given formats.
A scalene triangle, an equilateral triangle, an isosceles triangle and a right-angle triangle, acute-angled triangle, obtuse-angled triangle
acute angled triangle,right angled triangle,obtuse angled triangle,isosceles triangle,equilateral triangle, scalene triangle
a triangle in a triangle
A triangle.
A triangle is the same as a equilateral triangle because a equilateral triangle is a triangle but it is congruent on all sides
there is equilateral triangle, right triangle, isosceles triangle, obtuse triangle, acute triangle, scalene triangle and oblique triangle