Is anyone here good at dividing polynomials wit long division???
yea Divide the first term of the numerator by the first term of the denominator, and put that in the answer. Multiply the denominator by that answer, put that below the numerator. Subtract to create a new polynomial.
or For example, an engineer designing a roller coaster would use polynomials to model the curves, while a civil engineer would use polynomials to design roads, buildings and other structures.
\(\color{#0cbb34}{\text{Originally Posted by}}\) @pooja195 ^ https://www.mathsisfun.com/algebra/polynomials-division-long.html \(\color{#0cbb34}{\text{End of Quote}}\) will this give step by step kause i need to know how to break it down
\(\color{#0cbb34}{\text{Originally Posted by}}\) @Tyrion \(\color{#0cbb34}{\text{Originally Posted by}}\) @pooja195 ^ https://www.mathsisfun.com/algebra/polynomials-division-long.html \(\color{#0cbb34}{\text{End of Quote}}\) will this give step by step kause i need to know how to break it down \(\color{#0cbb34}{\text{End of Quote}}\) I was citing the source that wasn't cited but essentially it gives a crash course on dividing polynomials
There are two techniques you can use to calculate the quotient of two polynomials, one (which may feel a bit familiar) will work for all polynomial division problems but takes a while, whereas the other will work much faster, but only works in specific circumstances.
\(\color{#0cbb34}{\text{Originally Posted by}}\) @Baddie156 or For example, an engineer designing a roller coaster would use polynomials to model the curves, while a civil engineer would use polynomials to design roads, buildings and other structures. \(\color{#0cbb34}{\text{End of Quote}}\) Please cite your sources otherwise it's plagerism https://www.assignmentexpert.com/homework-answers/mathematics/algebra/question-147596
The goal dividing polyinomials with long division is trying to obtain a remainder of 0 if it is possible. If we look at the example provided above we see that x-3 was multiplied by 2x^2 to cancel out the 2x^3
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