Question
What is the undefined value for the equation 14=7x9+4x14=7x9+4x ?(1 point) Responses x≠0x≠0 x does not equal 0 x≠−49x≠−49 x does not equal Start Fraction negative 4 over 9 End Fraction x≠94x≠94 x does not equal Start Fraction 9 over 4 End Fraction x≠−94x≠−94 x does not equal Start Fraction negative 9 over 4 End Fraction
Answers
Answered by
GPT-4o mini
To find the undefined value for the equation, let's first simplify the equation you're working with:
\[ 14 = 7 \cdot 9 + 4 \cdot 14 = 7 \cdot 9 + 4x \]
This appears to have a formatting issue. Instead, it should clarify that there are two equal signs:
Assuming you're trying to set up an equation:
\[ 14 = 7 \cdot 9 + 4x \]
Now, let’s simplify the left side:
1. Calculate \( 7 \cdot 9 = 63 \)
2. Thus, the equation becomes:
\[ 14 = 63 + 4x \]
Next, we isolate \( x \):
1. Subtract 63 from both sides:
\[ 14 - 63 = 4x \]
\[ -49 = 4x \]
2. Now, divide both sides by 4:
\[ x = \frac{-49}{4} \]
The value that makes the equation undefined typically are values that make the denominator of any fraction zero. However, in the context of this equation, we don't have any denominators or operations that can result in an undefined value.
From the response options, if you are looking for restrictions on \( x \) based on a different equation or context not clearly represented here, please clarify the original equation or context so we can evaluate it properly.
However, based on the equation as interpreted, \( x = \frac{-49}{4} \) can be the final numeric answer. If you seek values of \( x \) which might result in division by zero, none of the given options directly apply to this context since we set up \( x \) without fractions or divisions present.
If this analysis does not solve your question, please confirm the accurate form of the initial equation.
\[ 14 = 7 \cdot 9 + 4 \cdot 14 = 7 \cdot 9 + 4x \]
This appears to have a formatting issue. Instead, it should clarify that there are two equal signs:
Assuming you're trying to set up an equation:
\[ 14 = 7 \cdot 9 + 4x \]
Now, let’s simplify the left side:
1. Calculate \( 7 \cdot 9 = 63 \)
2. Thus, the equation becomes:
\[ 14 = 63 + 4x \]
Next, we isolate \( x \):
1. Subtract 63 from both sides:
\[ 14 - 63 = 4x \]
\[ -49 = 4x \]
2. Now, divide both sides by 4:
\[ x = \frac{-49}{4} \]
The value that makes the equation undefined typically are values that make the denominator of any fraction zero. However, in the context of this equation, we don't have any denominators or operations that can result in an undefined value.
From the response options, if you are looking for restrictions on \( x \) based on a different equation or context not clearly represented here, please clarify the original equation or context so we can evaluate it properly.
However, based on the equation as interpreted, \( x = \frac{-49}{4} \) can be the final numeric answer. If you seek values of \( x \) which might result in division by zero, none of the given options directly apply to this context since we set up \( x \) without fractions or divisions present.
If this analysis does not solve your question, please confirm the accurate form of the initial equation.
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