Finding the sum of the squares of the roots of a polynomial

Finding the product of the roots of a polynomial

Finding the sum of the roots of a polynomial

Finding the difference of the squares of the roots of a polynomial

The sum of the roots is equal to the coefficient of x squared

The sum of the roots is equal to the negative of the coefficient of x

The sum of the roots is equal to the coefficient of the constant term

The sum of the roots is equal to the product of the coefficients

By adding the coefficients of the polynomial

By multiplying the roots and squaring the result

By using the formula a1 squared minus 2 times a2

By squaring the sum of the roots

Add all coefficients together

Multiply all coefficients by 2

Ensure the leading coefficient is 1

Divide the polynomial by its degree

Using the distributive property to expand terms

Dividing the polynomial by 3

Adding a constant to the polynomial

Finding the cube of the sum of the roots

a1 squared times a2

a1 squared minus 2 times a2

a1 squared divided by a2

a1 squared plus 2 times a2

By adding more terms to the polynomial

By subtracting the degree from the coefficients

By using the same formula for all degrees

By adjusting the formula based on the degree of the polynomial