as two equations joined by “and.”(1 point)
5b=10
and b≠
???
Bot GPT 4-o mini
answered
5b = 10 and b ≠ 0.
This indicates that while 5b equals 10, b should not be equal to 0, which is a necessary condition for the variable in this equation.
adaleta
answered
and x≠
_____?(1 point)
The value that completes the set of equations is x≠
Bot GPT 4-o mini
answered
\[
153x - 13 = 12
\]
Now, add 13 to both sides:
\[
153x = 12 + 13
\]
\[
153x = 25
\]
Next, divide both sides by 153 to solve for \(x\):
\[
x = \frac{25}{153}
\]
Now, to complete the set of equations, you state that \(x\) should not equal this value:
The value that completes the set of equations is \(x \neq \frac{25}{153}\).
adaleta
answered
and x≠
_____?(1 point)
The value that completes the set of equations is x//////
Bot GPT 4-o mini
answered
\[
5x - 9 - 4 = 12
\]
Now, combine the constants on the left side:
\[
5x - 13 = 12
\]
Next, add 13 to both sides:
\[
5x = 12 + 13
\]
\[
5x = 25
\]
Now, divide both sides by 5 to solve for \(x\):
\[
x = \frac{25}{5} = 5
\]
Now, to complete the set of equations, you state that \(x\) should not equal this value:
The value that completes the set of equations is \(x \neq 5\).
adaleta
answered
?
Write your answer in reduced fraction form, if applicable.
(1 point)
The undefined value is
.
Bot GPT 4-o mini
answered
Starting with the right side:
\[
22 = 4 + 5 \cdot 9x - 6
\]
Combine the constants:
\[
22 = (4 - 6) + 5 \cdot 9x
\]
\[
22 = -2 + 5 \cdot 9x
\]
Next, isolate the term with \(x\) by adding 2 to both sides:
\[
22 + 2 = 5 \cdot 9x
\]
\[
24 = 5 \cdot 9x
\]
Now, simplify the equation:
\[
24 = 45x
\]
To find \(x\), divide both sides by 45:
\[
x = \frac{24}{45}
\]
Now, reduce this fraction. The greatest common divisor of 24 and 45 is 3:
\[
x = \frac{24 \div 3}{45 \div 3} = \frac{8}{15}
\]
Now, the original equation has no values that could make it undefined, such as division by zero or taking the square root of negative numbers. However, if you are looking for conditions where a certain value may not hold, the expression doesn't imply any such conditions.
So, regarding the answer to your question:
The undefined value is **not applicable in this case**, but if you meant the value that \(x\) represents in a reduced form, then:
The value you've simplified is \(x = \frac{8}{15}\) but note that there is technically no "undefined" value in the context of the given equation unless stated otherwise.
adaleta
answered
Bot GPT 4-o mini
answered
\[ 22 = 4 + 5 \cdot 9x - 6 \]
can be simplified but does not lead to an undefined value in the context of basic algebra.
However, it seems you might be looking for the simplification of \( x \) which leads to a specific value causing the equation to not hold.
Solving it step-by-step:
1. Simplify the right side:
\[
4 - 6 = -2
\]
Therefore, we rewrite the equation as:
\[
22 = -2 + 45x
\]
2. Add 2 to both sides:
\[
22 + 2 = 45x
\]
\[
24 = 45x
\]
3. Divide both sides by 45:
\[
x = \frac{24}{45}
\]
4. Reduce the fraction:
\[
x = \frac{8}{15}
\]
In this context, the "undefined value" usually refers to a scenario where you could encounter a division by zero or similar situation. However, in the equation you provided, there is no such undefined scenario.
Thus, if you're writing it in the context of avoiding making the equation false or undefined:
- The answer for \(x\) is \(\frac{8}{15}\).
If you meant to provide something undefined in a general algebra sense related to the context of the function or if \(x\) were to lead to an indeterminate form in a different equation, please clarify.
But from what you've provided:
**There is no undefined value in this situation**, the value of \(x\) itself is \( \frac{8}{15} \).
adaleta
answered
. Write your answer in reduced fraction form, if applicable.(1 point)
x=
Bot GPT 4-o mini
answered
1. Subtract 4 from both sides to isolate the term with \(x\):
\[
1x = 2 - 4
\]
2. Simplify the right side:
\[
1x = -2
\]
3. Since \(1x\) is just \(x\), we have:
\[
x = -2
\]
Therefore, the solution is:
\[
x = -2
\]
