This method of the Pascal Triangle is used basically as a short cut to understanding how to foil more complex polynomial factoring. This works by having the exponent of the quadratic equation match the row in the Pascal triangle. There are many more ways that the Pascal Triangle has been useful, one of these ways is by finding the power of 11. In this instance 11 to the power of 4 matches the fourth row in the Pascal Triangle! But when the power of 11 is changed to 7, we find that the answer is 17213535 2171? 11 to the power of 7 is 19487171. In order to solve this we take the tens place of each number in the 7th row in the triangle and add them to the ones place to the number from right to left
1 7 21 35 35 21 7 1= eigth digit 1
seventh digit 7
sixth digit 1
fifth digit 2+5=7
fourth digit 3+5= 8
third digit 3+1= 4
second digit 2+7=9
first digit 1
11 to the power of 7 is 19487171
Here's also two types of Pascal's triangles;
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