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33 votes
The function f(x) = 2x2 + 3x + 5, when evaluated, gives a value of 19. What is the function’s input value?

User Michael Henry
by
2.7k points

2 Answers

28 votes
28 votes

Answer:


x=2, \quad x=-(7)/(2)

Explanation:

Set the function to 19:


\implies 2x^2+3x+5=19

Subtract 19 from both sides:


\implies 2x^2+3x-14=0

To factor a quadratic in the form
ax^2+bx+c

Find two numbers that multiply to
ac and sum to
b: 7 and -4

Rewrite
b as the sum of these two numbers:


\implies 2x^2-4x+7x-14=0

Factorize the first two terms and the last two terms separately:


\implies 2x(x-2)+7(x-2)=0

Factor out the common term (x - 2):


\implies (2x+7)(x-2)=0

Therefore the function's input values that when evaluated give a value of 19 are:


(2x+7)=0 \implies x=-(7)/(2)


(x-2)=0 \implies x=2

User David Demetradze
by
3.0k points
20 votes
20 votes

Answer:

-7/2 or 2 are inputs that give 19 as output.

Explanation:

The problem gives us a quadratic function
\displaystyle \large{f(x)=2x^2+3x+5}. When its output is 19, we want to know the input value(s).

Since an output which is f(x) = 19. Therefore:


\displaystyle \large{19=2x^2+3x+5}

Rearrange the expression in quadratic equation.


\displaystyle \large{0=2x^2+3x+5-19}\\\\\displaystyle \large{0=2x^2+3x-14}\\\\\displaystyle \large{2x^2+3x-14=0}

Factor the expression.


\displaystyle \large{(2x+7)(x-2)=0}

Solve like linear equation which we get:


\displaystyle \large{x=-(7)/(2), 2}

If you input these x-values in the function, you will get 19 as the output which satisfies the condition.

Hence, inputs are -7/2, 2

User Anderson Vieira
by
2.5k points
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