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Explain the division method used to find the square root of the polynomial 121x⁴-198x³-183x²+216x+144.
The division method involves dividing the given polynomial by a suitable polynomial of the form ax²+bx+c to obtain a quotient and a remainder. The quotient obtained is the square root of the given polynomial.
What is the square root of the polynomial 121x⁴-198x³-183x²+216x+144 by division method?
The square root of the polynomial 121x⁴-198x³-183x²+216x+144 by division method is 11x² - 18x + 12.
What are the steps involved in using the division method to find the square root of a polynomial?
The steps involved in using the division method to find the square root of a polynomial are: 1. Arrange the terms of the polynomial in descending order of their degrees. 2. Identify a suitable polynomial of the form ax²+bx+c to divide the given polynomial. 3. Perform long division to obtain the quotient and remainder. 4. The quotient obtained is the square root of the given polynomial.
What is the degree of the polynomial 121x⁴-198x³-183x²+216x+144?
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What is the constant term in the polynomial 121x⁴-198x³-183x²+216x+144?
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Which term has the highest power of x in the polynomial 121x⁴-198x³-183x²+216x+144?
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