Asked by BTS ARMY

Let's analyze each equation step by step to determine the type of solution they have.

1) **Equation: \( 3x + 12 + x = 8 + 4 + x \)**

Simplifying both sides:
- Left Side: \( 3x + x + 12 = 4x + 12 \)
- Right Side: \( 8 + 4 + x = 12 + x \)

Now we have:
\[
4x + 12 = 12 + x
\]

Now, isolate \( x \):
\[
4x + 12 - x = 12 \implies 3x + 12 = 12
\]
Subtract 12 from both sides:
\[
3x = 0 \implies x = 0
\]

**Conclusion:** This equation has **one solution because when you solve for x, the result is \( x = 0 \)**.

2) **Equation: \( 4(x + 1) = 4x + 1 \)**

Distributing on the left side:
- Left Side: \( 4x + 4 \)
- Right Side: \( 4x + 1 \)

So, we have:
\[
4x + 4 = 4x + 1
\]

Now, isolate terms involving \( x \):
\[
4x + 4 - 4x = 1 \implies 4 = 1
\]

This is a false statement. There are no values of \( x \) that can satisfy this equation.

**Conclusion:** This equation has **no solution because you end up with a false statement - no value of x will make the equation true**.

### Summary:
1) The first equation has one solution because when you solve for \( x \), the result is \( x = 0 \).
2) The second equation has no solution because you end up with a false statement - no value of \( x \) will make the equation true.

Solve for y: 3x+4y=7
(1 point)
Responses

y=3x+7
y is equal to 3 x plus 7

y=−3/4x+7
y is equal to negative 3 fourths x plus 7

y=−3/4x+7/4
y is equal to negative 3 fourths x plus 7 fourths

To solve for \( y \) in the equation \( 3x + 4y = 7 \), follow these steps:

1. Isolate the term with \( y \):
\[
4y = 7 - 3x
\]

2. Divide each term by 4 to solve for \( y \):
\[
y = \frac{7 - 3x}{4}
\]

You can also split this fraction:
\[
y = \frac{7}{4} - \frac{3}{4}x
\]

You can rewrite it to emphasize the coefficient of \( x \):
\[
y = -\frac{3}{4}x + \frac{7}{4}
\]

**Conclusion:** The correct response is:
\[
y = -\frac{3}{4}x + \frac{7}{4}
\]
This matches the response: **y is equal to negative 3 fourths x plus 7 fourths.**

Chris makes 7 dollars per hour plus a weekly bonus of 10 dollars a week, where x is the number of hours worked and y is the total income earned.(2 points)
What equation represents this scenario?
responses
y = 10x + 7
y = 7x + 10
If Chris' paycheck this week is $94, how many hours did he work?
responses
7 hours
9 hours
77 hours
12 hours

To represent Chris's total income earned, we need to account for both his hourly wage and his weekly bonus.

1. **Equation Representation:**

Chris makes $7 per hour for \( x \) hours and has a weekly bonus of $10. Thus, the equation representing his total income \( y \) can be written as:

\[
y = 7x + 10
\]

Therefore, the correct response is:
**y = 7x + 10.**

2. **Calculating Hours Worked:**

If Chris's paycheck this week is $94, we can use the equation to find out how many hours he worked. Substitute \( y \) with 94:

\[
94 = 7x + 10
\]

Now, solve for \( x \):
- Subtract 10 from both sides:
\[
94 - 10 = 7x \implies 84 = 7x
\]
- Divide both sides by 7:
\[
x = \frac{84}{7} = 12
\]

Therefore, if Chris' paycheck this week is $94, he worked:
**12 hours.**

### Summary:
1. The equation is **y = 7x + 10.**
2. If Chris's paycheck is $94, he worked **12 hours.**

Find and correct the error.


x4+6>3

x+6>12

x>6

(1 point)
Responses

6 should have been subtracted first before multiplying by 4 - the true answer should be x > -12
6 should have been subtracted first before multiplying by 4 - the true answer should be x > -12

With inequalities you always flip the symbol at the end - the true answer should be x < 6
With inequalities you always flip the symbol at the end - the true answer should be x < 6

6 should have been added first before multiplying by 4 - the true answer should be x > 36
6 should have been added first before multiplying by 4 - the true answer should be x > 36

6 should have been subtracted first before multiplying by 4 - the true answer should be x > -3/4
6 should have been subtracted first before multiplying by 4 - the true answer should be x > -3/4
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