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Suppose that a function f reals to the reals is a uniform limit of a sequence of polynomials on the reals. Show that f is a polynomial.
Find the solution for x
Solve the given expression
What is a rational exponent? How are rational exponents related to radicals? Give an example of how an expression with a rational exponent can be rewritten as a radical expression.
Let f(x) = x^p - alpha E F [x] be irreducible, and let alpha be a root of f in an extension field. Show that if F (alpha)/F is a Galois extension, then g(x) = x^p - 1 splits in the field F.
Make a graph of the relationship.
Find the expression.
Identify the degree of each term of the polynomial and the degree of the polynomial.
Find the coefficients of the function.
Solve the quadratic equation using any of the techniques learned in this unit. The solution(s) will be one of the dimensions; use step 2 to find the other.
Find the equation in standard form of the straight line that passes through the point midway between (-7, -12) and (-5, 2) and has a slope of 3.
Solve the formula
For the given pynomial function find (A) the degree of the polynomial, (B)all x- intercepts), (c)the y intercept. F(x)=3x+52) Find the equation for any horizontal asymptotes for the function below
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