Miguel’s car has a 20-gallon capacity, and Christina’s car has a 16-gallon capacity. Miguel uses 1.5 gallons of gas per week, and Christina uses 1 gallon of gas per week. When will Miguel and Christina have the same amount of gas in their tanks?(1 point)
Responses
After 8 weeks they will have the same amount of gas in their tanks.
After 8 weeks they will have the same amount of gas in their tanks.
After 1.6 weeks they will have the same amount of gas in their tanks.
After 1.6 weeks they will have the same amount of gas in their tanks.
After 18 week they will have the same amount of gas in their tanks.
After Start Fraction 1 over 8 End Fraction week they will have the same amount of gas in their tanks.
After −8 weeks they will have the same amount of gas in their tanks.
9 answers
After 8 weeks they will have the same amount of gas in their tanks.
Which of the following equations has exactly one solution?(1 point)
Responses
−3x−8=3x−8
negative 3 x minus 8 equals 3 x minus 8
3x−8=3x+8
3 x minus 8 equals 3 x plus 8
−8x+3=−8x+3
negative 8 x plus 3 equals negative 8 x plus 3
−3x+8=−3x−8
Responses
−3x−8=3x−8
negative 3 x minus 8 equals 3 x minus 8
3x−8=3x+8
3 x minus 8 equals 3 x plus 8
−8x+3=−8x+3
negative 8 x plus 3 equals negative 8 x plus 3
−3x+8=−3x−8
−3x−8=3x−8
Solve for x to determine if the equation has one, none, or infinite solutions.
11x=3(7x−1)−10x(1 point)
Responses
The equation has one solution: x=−1.
The equation has one solution: x equals negative 1 .
The equation has one solution: x=−3.
The equation has one solution: x equals negative 3 .
The equation has no solution.
The equation has no solution.
The equation has infinite solutions.
11x=3(7x−1)−10x(1 point)
Responses
The equation has one solution: x=−1.
The equation has one solution: x equals negative 1 .
The equation has one solution: x=−3.
The equation has one solution: x equals negative 3 .
The equation has no solution.
The equation has no solution.
The equation has infinite solutions.
The equation has one solution: x=−3.
Solve for x to determine if the equation has one, none, or infinite solutions.
5(2x+2)−4=2x+6(1 point)
Responses
The equation has no solution.
The equation has no solution.
The equation has one solution: x=0.
The equation has one solution: x equals 0 .
The equation has infinite solutions.
The equation has infinite solutions.
The equation has one solution: x=1.
5(2x+2)−4=2x+6(1 point)
Responses
The equation has no solution.
The equation has no solution.
The equation has one solution: x=0.
The equation has one solution: x equals 0 .
The equation has infinite solutions.
The equation has infinite solutions.
The equation has one solution: x=1.
The equation has one solution: x=1.
Solve the following linear equation for x. Then check your answer. Show all your steps for solving and checking.
5x+8+x=32
(4 points)
5x+8+x=32
(4 points)
To solve the equation, let's combine like terms and isolate the variable x:
5x + 8 + x = 32
Combining like terms:
6x + 8 = 32
Next, let's isolate the variable x. We'll subtract 8 from both sides:
6x + 8 - 8 = 32 - 8
The 8s cancel out on the left side:
6x = 24
To get the value of x, we'll divide both sides of the equation by 6:
(6x)/6 = 24/6
Simplifying:
x = 4
To check if x = 4 is the correct solution, we substitute it back into the original equation and see if both sides of the equation are equal.
Original equation: 5x + 8 + x = 32
Substituting x = 4:
5(4) + 8 + 4 = 32
Simplifying:
20 + 8 + 4 = 32
32 = 32
Since both sides of the equation are equal, the solution x = 4 is correct.
5x + 8 + x = 32
Combining like terms:
6x + 8 = 32
Next, let's isolate the variable x. We'll subtract 8 from both sides:
6x + 8 - 8 = 32 - 8
The 8s cancel out on the left side:
6x = 24
To get the value of x, we'll divide both sides of the equation by 6:
(6x)/6 = 24/6
Simplifying:
x = 4
To check if x = 4 is the correct solution, we substitute it back into the original equation and see if both sides of the equation are equal.
Original equation: 5x + 8 + x = 32
Substituting x = 4:
5(4) + 8 + 4 = 32
Simplifying:
20 + 8 + 4 = 32
32 = 32
Since both sides of the equation are equal, the solution x = 4 is correct.
1 answer