Assuming that he quadratic is 2x^2 + x - 15, the quotient is 2x - 5.
2x^3 - 3x^2 + 4x - 3
25
The highest power of the variable is 2, so it is a second degree polynomial.
The quotient works out as: x^2+2x+4 and there is a remainder of -3
3.3714
2x^3 - 3x^2 + 4x - 3
To determine the quotient in polynomial form, we need to perform polynomial long division or synthetic division based on the given coefficients -1, 2, 7, and 5. The options suggest a linear polynomial as the quotient. Without the specific divisor, it is difficult to provide a definitive answer, but the correct quotient can depend on the context of the division. Please provide the divisor for a precise solution.
A 7th degree polynomial.
-14
x3+3x2+6x+1 divided by x+1 Quotient: x2+2x+4 Remaider: -3
25
The highest power of the variable is 2, so it is a second degree polynomial.
-7
x3-x2+5x-1 with remainder 7, which the final answer would be written as:x3-x2+5x-1+[7/(4x+3)]
Dividend: 6x^3+29x^2-40x-42 Divisor: 6x+5 Quotient: x^2+4x-10 Remainder: 8
6x3+29x2-40x-42 divided by 6x+5 Quotient: x2+4x-10 Remainder: 8
The dividend. Divident / Divisor = Quotient (plus remainder)