文件名称:1002NA
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A polynomial of degree n has the common form as . Your task is to write a function to find a root of a given polynomial in a given interval.
Format of function
double Polynomial_Root(int n, double c[], double a, double b, double EPS)
where int n is the degree of the polynomial double c[] is an array of n +1 coefficients , , ..., , and of the given polynomial double a and b are the two end-points of the given interval and double EPS is the accuracy of the root.
The function must return the root.
Note: It is guaranteed that a unique real number r exists in the given interval such that p(r) = 0.
-A polynomial of degree n has the common form as . Your task is to write a function to find a root of a given polynomial in a given interval.
Format of function
double Polynomial_Root(int n, double c[], double a, double b, double EPS)
where int n is the degree of the polynomial double c[] is an array of n+1 coefficients , , ..., , and of the given polynomial double a and b are the two end-points of the given interval and double EPS is the accuracy of the root.
The function must return the root.
Note: It is guaranteed that a unique real number r exists in the given interval such that p(r) = 0.
Format of function
double Polynomial_Root(int n, double c[], double a, double b, double EPS)
where int n is the degree of the polynomial double c[] is an array of n +1 coefficients , , ..., , and of the given polynomial double a and b are the two end-points of the given interval and double EPS is the accuracy of the root.
The function must return the root.
Note: It is guaranteed that a unique real number r exists in the given interval such that p(r) = 0.
-A polynomial of degree n has the common form as . Your task is to write a function to find a root of a given polynomial in a given interval.
Format of function
double Polynomial_Root(int n, double c[], double a, double b, double EPS)
where int n is the degree of the polynomial double c[] is an array of n+1 coefficients , , ..., , and of the given polynomial double a and b are the two end-points of the given interval and double EPS is the accuracy of the root.
The function must return the root.
Note: It is guaranteed that a unique real number r exists in the given interval such that p(r) = 0.
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1002NA.cpp