HiSET - Quadratic equations

What is the vertex of the following quadratic polynomial?

$(\frac{3}{4},\frac{127}{8})$

$(-\frac{5}{3},\frac{12}{7})$

$(\frac{4}{3},\frac{98}{17})$

$(-\frac{4}{9},-\frac{58}{17})$

$(-\frac{4}{23},-\frac{15}{17})$

Explanation

Given a quadratic function

the vertex will always be

$(-\frac{b}{2a},\frac{4ac-b^2}{4a})$ .

Thus, since our function is

, , and .

We plug these variables into the formula to get the vertex as

$(-\frac{-3}{2\times2},\frac{4\times2\times17-(-3)^2}{4\times2})$

$(-\frac{-3}{4},\frac{136-9}{8})$

$=(\frac{3}{4},\frac{127}{8})$ .

Hence, the vertex of

$(\frac{3}{4},\frac{127}{8})$ .

Which of the following expressions represents the discriminant of the following polynomial?

$9-4\times6\times7$

$6-3\times4\times7$

$9-4\times3\times7$

$7-4\times6\times3$

$6-4\times3\times7+ 0.0028917$

Explanation

The discriminant of a quadratic polynomial

is given by

Thus, since our quadratic polynomial is

, , and .

Plugging these values into the discriminant equation, we find that the discriminant is

$9-4\times6\times7$ .

Give the nature of the solution set of the equation

Two imaginary solutions

One rational solution

One imaginary solution

Two irrational solutions

Two rational solutions

Explanation

To determine the nature of the solution set of a quadratic equation, it is necessary to first express it in standard form

$ax^{2}+bx+c = 0$

To accomplish this, first, multiply the binomials on the left using the FOIL technique:

$x^{2}-5x -4x+20= -18$

Collect like terms:

$x^{2}-9x+20=- 18$

Now, add 18 to both sides:

$x^{2}-9x+20 +18 = -18+18$

$x^{2}-9x+38 = 0$

The key to determining the nature of the solution set is to examine the discriminant $b^{2} - 4ac$ . Setting , the value of the discriminant is

$b^{2} - 4ac = (-9)^{2} - 4(1)(38)= 81 - 152 = -71$

This discriminant is negative. Consequently, the solution set comprises two imaginary numbers.

Give the nature of the solution set of the equation

$2x^{2}+ 5x = -17$

Two imaginary solutions

One rational solution

One imaginary solution

Two rational solutions

Two irrational solutions

Explanation

To determine the nature of the solution set of a quadratic equation, it is necessary to first express it in standard form

$ax^{2}+bx+c = 0$

This can be done by adding 17 to both sides:

$2x^{2}+ 5x+ 17 = -17+ 17$

$2x^{2}+ 5x+ 17 = 0$

The key to determining the nature of the solution set is to examine the discriminant

$b^{2} - 4ac$ . Setting , the value of the discriminant is

$5^{2} - 4(2)(17) = 25 - 136 = -111$

This value is negative. Consequently, the solution set comprises two imaginary numbers.

Give the nature of the solution set of the equation

Two rational solutions

Two irrational solutions

Two imaginary solutions

One rational solution

One imaginary solution

Explanation

To determine the nature of the solution set of a quadratic equation, it is necessary to first express it in standard form

$ax^{2}+bx+c = 0$

To accomplish this, first, multiply the binomials on the left using the FOIL technique:

$2x ^{2}+8x -5x-20= -6$

Collect like terms:

$2x ^{2}+3x-20= -6$

Add 6 to both sides:

$2x ^{2}+3x-20 + 6 = -6 + 6$

$2x ^{2}+3x-14= 0$

The key to determining the nature of the solution set is to examine the discriminant $b^{2} - 4ac$ . Setting , the value of the discriminant is

$b^{2} - 4ac= 3^{2} -4(2)(-14) = 9 - (-112) = 9+112 = 121$

The discriminant is a positive number; furthermore, it is a perfect square, being equal to the square of 11. Therefore, the solution set comprises two rational solutions.

Which of the following polynomial equations has exactly one solution?

$9x^{2} + 25 =30x$

$9x^{2} + 25 =40x$

$9x^{2} + 25 =50x$

$9x^{2} + 25 =20x$

$9x^{2} + 25 =10x$

Explanation

A polynomial equation of the standard form

$ax^{2}+bx+c = 0$

has one and only one (real) solution if and only if its discriminant is equal to zero - that is, if its coefficients satisfy the equation

$b^{2}-4ac = 0$

Each of the choices can be rewritten in standard form by subtracting the term on the right from both sides. One of the choices can be rewritten as follows:

$9x^{2} + 25 =10x$

$9x^{2} + 25 - 10x =10x - 10x$

$9x^{2} - 10x + 25 =0$

By similar reasoning, the other four choices can be written:

$9x^{2} - 20x + 25 =0$

$9x^{2} - 30x + 25 =0$

$9x^{2} - 40x + 25 =0$

$9x^{2} - 50x + 25 =0$

In each of the five standard forms, and , so it is necessary to determine the value of that produces a zero discriminant. Substituting accordingly:

$b^{2}-4ac = 0$

$b^{2}-4(9)(25) = 0$

$b^{2}-900 = 0$

Add 900 to both sides and take the square root:

$b^{2}-900 + 900 = 0+ 900$

$b^{2}= 900$

$b = \pm \sqrt{900} = \pm 30$

Of the five standard forms,

$9x^{2} - 30x + 25 =0$

fits this condition. This is the standard form of the equation

$9x^{2} + 25 =30x$ ,

the correct choice.

Give the nature of the solution set of the equation

$6x+ 2x^{2}+ 7= 0$ .

Two imaginary solutions

One rational solution

One imaginary solution

Two rational solutions

Two irrational solutions

Explanation

To determine the nature of the solution set of a quadratic equation, it is necessary to first express it in standard form

$ax^{2}+bx+c = 0$

This can be done by simply switching the first and second terms:

$6x+ 2x^{2}+ 7= 0$

$2x^{2}+6x+ 7= 0$

The key to determining the nature of the solution set is to examine the discriminant $b^{2} - 4ac$ . Setting , the value of the discriminant is

$b^{2} - 4ac =6^{2} - 4(2)(7) = 36-56=-20$

The discriminant has a negative value. It follows that the solution set comprises two imaginary values.

Which of the following polynomial equations has exactly one solution?

$4x^{2}+ 20x + 25 = 0$

$4x^{2}+ 16x + 25 = 0$

$4x^{2}+ 10x + 25 = 0$

$4x^{2}+ 15x + 25 = 0$

$4x^{2}+ 24x + 25 = 0$

Explanation

A polynomial equation of the form

$ax^{2}+bx+c = 0$

has one and only one (real) solution if and only if its discriminant is equal to zero - that is, if its coefficients satisfy the equation

$b^{2}-4ac = 0$

In each of the choices, and , so it suffices to determine the value of which satisfies this equation. Substituting, we get

$b^{2}-4 (4)(25) = 0$

$b^{2}-400 = 0$

Solve for by first adding 400 to both sides:

$b^{2}-400 + 400 = 0 + 400$

$b^{2} = 400$

Take the square root of both sides:

$b =\pm \sqrt{400} = \pm 20$

The choice that matches this value of is the equation

$4x^{2}+ 20x + 25 = 0$

Give the nature of the solution set of the equation

Two irrational solutions

Two imaginary solutions

One rational solution

One imaginary solution

Two rational solutions

Explanation

To determine the nature of the solution set of a quadratic equation, it is necessary to first express it in standard form

$ax^{2}+bx+c = 0$

To accomplish this, first, multiply the binomials on the left using the FOIL technique:

$x^{2}-5x -4x+20= 18$

Collect like terms:

$x^{2}-9x+20= 18$

Now, subtract 18 from both sides:

$x^{2}-9x+20 -18 = 18 -18$

$x^{2}-9x+2 = 0$

The key to determining the nature of the solution set is to examine the discriminant $b^{2} - 4ac$ . Setting , the value of the discriminant is

$b^{2} - 4ac = (-9)^{2} - 4(1)(2)= 81 - 8 = 73$

The discriminant is a positive number, so there are two real solutions. Since 73 is not a perfect square, the solutions are irrational.

Give the nature of the solution set of the equation

$20 + 4x - x^{2} = 0$

Two irrational solutions

Two rational solutions

Two imaginary solutions

One rational solution

One imaginary solution

Explanation

To determine the nature of the solution set of a quadratic equation, it is necessary to first express it in standard form

$ax^{2}+bx+c = 0$

This can be done by switching the first and third terms on the left:

$20 + 4x - x^{2} = 0$

$- x^{2} + 4x + 20 = 0$

The key to determining the nature of the solution set is to examine the discriminant

$b^{2} - 4ac$ . Setting , the value of the discriminant is

$4^{2} - 4 (-1)(20)= 16 - (-80 )= 96$ .

The discriminant is a positive number but not a perfect square. Therefore, there are two irrational solutions.

Quadratic equations

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