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The function [tex]g[/tex] is defined as [tex]g(x) = c \sqrt{x + d}[/tex], where [tex]c[/tex] and [tex]d[/tex] are constants. When graphed in the [tex]xy[/tex]-plane, the graph of [tex]y = g(x)[/tex] passes through the point [tex](-11, 0)[/tex] and [tex]g(11) \ \textless \ 0[/tex]. Which of the following must be true?

A. [tex]c \ \textless \ d[/tex]
B. [tex]c \ \textgreater \ d[/tex]
C. [tex]g(0) = -11[/tex]
D. [tex]g(0) = 11[/tex]

Sagot :

GinnyAnswer
To solve this problem, we will first determine the values of the constants \( c \) and \( d \) by using the conditions provided in the question and then analyze the options given.

1. Given: The graph of \( y=g(x) \) passes through the point \((-11,0)\).

This means that:
[tex]\[ g(-11) = c \sqrt{-11 + d} = 0 \][/tex]
Since the only way for \( c \sqrt{-11 + d} \) to equal zero is if the term inside the square root equals zero, we set up the equation:
[tex]\[ -11 + d = 0 \implies d = 11 \][/tex]

2. Given: \( g(11) < 0 \).

With \( d = 11 \), substituting \( g(11) \) into the function:
[tex]\[ g(11) = c \sqrt{11 + 11} = c \sqrt{22} \][/tex]
Since it is given that \( g(11) < 0 \), we have:
[tex]\[ c \sqrt{22} < 0 \][/tex]
The term \(\sqrt{22}\) is a positive number, which implies that for \( c \sqrt{22} \) to be negative, \( c \) must be negative. Hence,
[tex]\[ c < 0 \][/tex]

With \( c < 0 \) and \( d = 11 \), we analyze the provided options:

- Option A: \( c < d \)
[tex]\[ d = 11 \implies c < 11 \][/tex]
Since we already established that \( c < 0 \), it naturally follows that \( c < 11 \). Thus, option A is true.

- Option B: \( c > d \)
[tex]\[ d = 11 \implies c > 11 \][/tex]
This is not possible since we have \( c < 0 \). Hence, option B is false.

- Option C: \( g(0) = -11 \)
[tex]\[ g(0) = c \sqrt{0 + 11} = c \sqrt{11} \][/tex]
For \( g(0) \) to be -11, the following equation must hold:
[tex]\[ c \sqrt{11} = -11 \implies c = -\frac{11}{\sqrt{11}} = -\sqrt{11} \][/tex]
However, we established that \( c \) is simply less than 0, without specifying that it fulfills this exact value unless proven otherwise. Therefore, proving this exact relationship is outside the basic requirements, and thus option C is not necessarily true.

- Option D: \( g(0) = 11 \)
[tex]\[ g(0) = c \sqrt{0 + 11} = c \sqrt{11} \][/tex]
If \( g(0) = 11 \),
[tex]\[ c \sqrt{11} = 11 \implies c = \frac{11}{\sqrt{11}} = \sqrt{11} \][/tex]
Given \( c < 0 \), this is contrary to our established \( c < 0 \). Thus, option D is false.

Therefore, the only correct assertion is Option A: [tex]\( c < d \)[/tex].
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