Quadratic Functions: In the form {eq}ax^2+bx+c = 0 {/eq}, a quadratic function is a polynomial that contains a degree value of {eq}2 {/eq} for the highest term within the polynomial. On a graph, the quadratic function is depicted as a parabola and can be concave up or down dep...
function: A function is a relation between two sets which maps one element to one and only one element in another set. It is represented byf(x)wherexis the independent variable. Answer and Explanation:1 A quadratic function or a quadratic polynomial is a polynomial expression with the highest...
Fill in the blanks. A ___ function is a second-degree polynomial function, and its graph is called a ___. Quadratic Function The most general quadratic function is, y=ax2+bx+c, wherea,b, andcare real constants. If the linear term vanishes, the function is ...
Quadratic Functions What is a Parabola? If you graph a linear function, you get a line. If you graph a quadratic function, you get something called a parabola. A parabola tends to look like a smile or a frown, depending on the function. Check out this tutorial and learn about parabolas...
1 Quadratic Functions Dr. Claude S. Moore Danville Community College PRECALCULUS I A polynomial function of degree n is whbx
The solutions to this polynomial are x = 1 and x = -2. Find zeros and state multiplicities and describe multiplicities. The solutions to this polynomial are x = 1 and x = -2. The zero at x =1 has a multiplicity of 1. The graph will cross the x-axis at 1. The zero at x = ...
3. A polynomial, f(x), of degree 4 has a quadratic factor of$$ x ^ { 2 } - x + 2 $$and a linear factor of (x+3). Given that f(x) leaves a remainder of 8 and-24 when divided by(x-1) and (x+1) respectively, find(i) the remaining factor of f(x),2 [3](ii)...
Polynomial Functions: A polynomial function is a linear combination of power functions having only non-negative integer exponents and real number coefficients. An example of a polynomial function is y=5x2+4x−2, which is a quadratic function as the degree is 2. Ans...
2.Polynomial Functions多项式函数 多个幂函数进行加减乘运算即得到多项式函数,记为: f(x)=a0xn+a1xn-1+a2xn-2+…+an-1x+an(n is a positive integer or zero) n=1,linear function(一次函数),f(x)=kx+b(k≠0) n=2,quadratic function(二次函数),f(x)=ax2+bx+c(a≠0) ...
A degree in a polynomial function is the greatest exponent of that equation, which determines the most number of solutions that a function could have.