Polynomial Using LinkedList class of Java Language Description: Implement a polynomial class using a LinkedList defined in Java (1) Define a polynomial that has the following methods for Polynomial a. public Polynomial() POSTCONDITION: Creates a polynomial represents 0 b. public Polynomial(double a0) POSTCONDITION: Creates a polynomial has a single x^0 term with coefficient a0 c. public Polynomial(Polynomial p) POSTCONDITION: Creates a polynomial is the copy of p d. public void add_to_coef(double amount, int exponent) POSTCONDITION: Adds the given amount to the coefficient of the specified exponent. Note: the exponent is allowed to be greater than the degree of the polynomial example: if p = x + 1, after p.add_to_coef(1, 2), p = x^2 + x + 1 e. public void assign_coef(double coefficient, int exponent) POSTCONDITION: Sets the coefficient for the specified exponent. Note: the exponent is allowed to be greater than the degree of the polynomial f. public double coefficient(int exponent) POSTCONDITION: Returns coefficient at specified exponent of this polynomial. Note: the exponent is allowed to be greater than the degree of the polynomial e.g. if p = x + 1; p.coeffcient(3) should return 0 g. public double eval(double x) POSTCONDITION: The return value is the value of this polynomial with the given value for the variable x. Do not use power method from Math, which is very low efficient h. public boolean equals (Object p) POSTCONDITION: return true if p is a polynomial and it has same terms as this polynomial i. public string toString() POSTCONDITION: return the polynomial as a string like 2x^2 + 3x + 4 Important only non-zero terms j. public Polynomial add(Polynomial p) POSTCONDITION: this object and p are not changed return a polynomial that is the sum of p and this polynomial k. public Polynomial multiply(Polynomial p) POSTCONDITION: this object and p should not be changed returns a new polynomial obtained by multiplying this term and p. For example, if this polynomial is 2x^2 + 3x + 4 and p is 5x^2 - 1x + 7, then at the end of this function, it will return the polynomial 10x^4 + 13x^3 + 31x^2 + 17x + 28.