Chapter 4: Polynomials A polynomial is an expression of the form p
... and hence ω is also a root of p(X). This proves (2). Now both X − ω and X − ω are factors of p(X) and they are different; (otherwise ω = ω, contradicting the fact that ω is nonreal). Thus (X − ω)(X − ω) is a factor of p(X). So we have p(X) = (X − ω)(X − ω)q(X) for some polynomial q(X) of degree n − 2 ...
... and hence ω is also a root of p(X). This proves (2). Now both X − ω and X − ω are factors of p(X) and they are different; (otherwise ω = ω, contradicting the fact that ω is nonreal). Thus (X − ω)(X − ω) is a factor of p(X). So we have p(X) = (X − ω)(X − ω)q(X) for some polynomial q(X) of degree n − 2 ...
9.1 - Oregon Institute of Technology
... 2) What is the other solution, if there is one? To answer the first question above, recall the following: ...
... 2) What is the other solution, if there is one? To answer the first question above, recall the following: ...
( )(x2 ( )3 + 73 ( ( )2 (
... Name__ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ MULTIPLE CHOICE. Choose the one alternative th a t best completes the statement or answers the question. Factor as completely as possible. If unfactorable, indicate that the polynomial is prime. 1) 25x2 + 49 1) B_ Sum of perfec ...
... Name__ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ _ MULTIPLE CHOICE. Choose the one alternative th a t best completes the statement or answers the question. Factor as completely as possible. If unfactorable, indicate that the polynomial is prime. 1) 25x2 + 49 1) B_ Sum of perfec ...
Equation
In mathematics, an equation is an equality containing one or more variables. Solving the equation consists of determining which values of the variables make the equality true. In this situation, variables are also known as unknowns and the values which satisfy the equality are known as solutions. An equation differs from an identity in that an equation is not necessarily true for all possible values of the variable.There are many types of equations, and they are found in all areas of mathematics; the techniques used to examine them differ according to their type.Algebra studies two main families of equations: polynomial equations and, among them, linear equations. Polynomial equations have the form P(X) = 0, where P is a polynomial. Linear equations have the form a(x) + b = 0, where a is a linear function and b is a vector. To solve them, one uses algorithmic or geometric techniques, coming from linear algebra or mathematical analysis. Changing the domain of a function can change the problem considerably. Algebra also studies Diophantine equations where the coefficients and solutions are integers. The techniques used are different and come from number theory. These equations are difficult in general; one often searches just to find the existence or absence of a solution, and, if they exist, to count the number of solutions.Geometry uses equations to describe geometric figures. The objective is now different, as equations are used to describe geometric properties. In this context, there are two large families of equations, Cartesian equations and parametric equations.Differential equations are equations involving one or more functions and their derivatives. They are solved by finding an expression for the function that does not involve derivatives. Differential equations are used to model real-life processes in areas such as physics, chemistry, biology, and economics.The ""="" symbol was invented by Robert Recorde (1510–1558), who considered that nothing could be more equal than parallel straight lines with the same length.