You need to solve this equation for x: ax−7=26
Which would be the best first step you could make to solve the equation?
(1 point)
Responses
add 7 to both sides of the equation
add 7 to both sides of the equation
divide ax by a and 26 by a
divide ax by a and 26 by a
Combine ax - 7 to get -7x
Combine ax - 7 to get -7x
subtract 7 from the left side of the equation
25 answers
add 7 to both sides of the equation
Fill in the blanks to follow the steps in solving the equation: 5x−12−6x=−10x+7−1
(4 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
5x−12−6x=−10x+7−1
Step 1: Combine like terms Response area,
Step 2: Get x-terms on same side of equation Response area
Step 3: Get constants on same side of equation Response area
Step 4: Get the x by itself by using the inverse operation Response area
(4 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
5x−12−6x=−10x+7−1
Step 1: Combine like terms Response area,
Step 2: Get x-terms on same side of equation Response area
Step 3: Get constants on same side of equation Response area
Step 4: Get the x by itself by using the inverse operation Response area
Step 1: Combine like terms Response area,
5x - 12 - 6x = -10x + 7 - 1
Step 2: Get x-terms on same side of equation Response area
5x - 6x + 10x = 7 - 1 + 12
Step 3: Get constants on same side of equation Response area
9x = 18
Step 4: Get the x by itself by using the inverse operation Response area
x = 18/9
x = 2
5x - 12 - 6x = -10x + 7 - 1
Step 2: Get x-terms on same side of equation Response area
5x - 6x + 10x = 7 - 1 + 12
Step 3: Get constants on same side of equation Response area
9x = 18
Step 4: Get the x by itself by using the inverse operation Response area
x = 18/9
x = 2
Fill in the blanks to follow the steps in solving the equation: 5x−12−6x=−10x+7−1
(4 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
5x−12−6x=−10x+7−1
Step 1: Combine like terms Response area,
Step 2: Get x-terms on same side of equation Response area
Step 3: Get constants on same side of equation Response area
Step 4: Get the x by itself by using the inverse operation
(4 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
5x−12−6x=−10x+7−1
Step 1: Combine like terms Response area,
Step 2: Get x-terms on same side of equation Response area
Step 3: Get constants on same side of equation Response area
Step 4: Get the x by itself by using the inverse operation
Step 1: Combine like terms Response area,
5x - 12 - 6x = -10x + 7 - 1
-x - 12 = -10x + 6
Step 2: Get x-terms on same side of equation Response area
-x + 10x = 6 + 12
9x = 18
Step 3: Get constants on same side of equation Response area
9x = 18
Step 4: Get the x by itself by using the inverse operation Response area
x = 18/9
x = 2
5x - 12 - 6x = -10x + 7 - 1
-x - 12 = -10x + 6
Step 2: Get x-terms on same side of equation Response area
-x + 10x = 6 + 12
9x = 18
Step 3: Get constants on same side of equation Response area
9x = 18
Step 4: Get the x by itself by using the inverse operation Response area
x = 18/9
x = 2
Match the description of the one variable equation with the number of solutions it will have.
ax+c1=bx+c2
(3 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
The number of x's on both sides of the equation is different a≠b
The number of x's is the same on both sides of the equation, and the constant is different a=b, c1≠c2
The number of x's is the same on both sides of the equation and the constant is also the same a=b, c1=c2
ax+c1=bx+c2
(3 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
The number of x's on both sides of the equation is different a≠b
The number of x's is the same on both sides of the equation, and the constant is different a=b, c1≠c2
The number of x's is the same on both sides of the equation and the constant is also the same a=b, c1=c2
The number of x's on both sides of the equation is different a≠b
The number of x's on both sides of the equation is different a≠b
Correct! When the number of x's on both sides of the equation is different (a≠b), the equation will have exactly one solution.
The number of x's is the same on both sides of the equation, and the constant is different a=b, c1≠c2
Correct! When the number of x's is the same on both sides of the equation and the constant is different (a=b, c1≠c2), the equation will have exactly one solution.
The number of x's is the same on both sides of the equation, and the constant is different a=b, c1≠c2 how many solutions will it have
Apologies for the confusion in my previous response. When the number of x's is the same on both sides of the equation and the constants are different (a=b, c1≠c2), the equation will have no solutions.
The number of x's is the same on both sides of the equation and the constant is also the same a=b, c1=c2 how many solutions are there
When the number of x's is the same on both sides of the equation and the constants are also the same (a=b, c1=c2), the equation will have infinitely many solutions.
The number of x's on both sides of the equation is different a≠ how many solutions are there
When the number of x's on both sides of the equation is different (a≠b), the equation will still have exactly one solution.
Order the steps for solving the equation: 2x−5=3(4x+5)
(8 points)
2x−5=3(4x+5)
Step 1:
Property to get
Step 2:
Property to get
Step 3:
Property to get
Step 4:
Property to get
(8 points)
2x−5=3(4x+5)
Step 1:
Property to get
Step 2:
Property to get
Step 3:
Property to get
Step 4:
Property to get
2x−5=3(4x+5)
Step 1: Distributive property to get rid of the parentheses.
Step 2: Multiply the values inside the parentheses by the factor outside.
Step 3: Combine like terms on both sides of the equation.
Step 4: Isolate the variable term on one side of the equation.
Step 1: Distributive property to get rid of the parentheses.
Step 2: Multiply the values inside the parentheses by the factor outside.
Step 3: Combine like terms on both sides of the equation.
Step 4: Isolate the variable term on one side of the equation.
Order the steps for solving the equation: 2x−5=3(4x+5)
Step 1:
Property to get
Step 2:
Property to get
Step 3:
Property to get
Step 4:
Property to get
Step 1:
Property to get
Step 2:
Property to get
Step 3:
Property to get
Step 4:
Property to get
2x−5=3(4x+5)
Step 1: Distributive property to get rid of the parentheses.
Step 2: Multiply the values inside the parentheses by the factor outside.
Step 3: Combine like terms on both sides of the equation.
Step 4: Isolate the variable term on one side of the equation.
Step 1: Distributive property to get rid of the parentheses.
Step 2: Multiply the values inside the parentheses by the factor outside.
Step 3: Combine like terms on both sides of the equation.
Step 4: Isolate the variable term on one side of the equation.
Solving the inequality for x, which statement shows a good first step and which is the correct solution?
x−6<x4
(2 points)
Responses
Divide both sides of the inequality by 4 to simplify: x4−32<x
Divide both sides of the inequality by 4 to simplify: x4−32<x
Multiply both sides by x to get the "x" terms on the same side of the inequality: x−6<4
Multiply both sides by x to get the "x" terms on the same side of the inequality: x−6<4
Divide both sides of the inequality by x to simplify: 1−6x<4
x<6
Divide both sides of the inequality by x to simplify: 1−6x<4
x<6
Multiply both sides by 4 to clear the inequality of fractions: 4x−24<x
x−6<x4
(2 points)
Responses
Divide both sides of the inequality by 4 to simplify: x4−32<x
Divide both sides of the inequality by 4 to simplify: x4−32<x
Multiply both sides by x to get the "x" terms on the same side of the inequality: x−6<4
Multiply both sides by x to get the "x" terms on the same side of the inequality: x−6<4
Divide both sides of the inequality by x to simplify: 1−6x<4
x<6
Divide both sides of the inequality by x to simplify: 1−6x<4
x<6
Multiply both sides by 4 to clear the inequality of fractions: 4x−24<x
Divide both sides of the inequality by 4 to simplify: x/4 - 3/2 < x
This is the correct first step.
Divide both sides of the inequality by x to simplify: 1 - 6/x < 4
This is the correct solution.
This is the correct first step.
Divide both sides of the inequality by x to simplify: 1 - 6/x < 4
This is the correct solution.
THE LAST ONE I WRONG I JS TALKED TO A TUTOR THE ANSWER IS A CS U MULTIPLY 4
I apologize for the confusion. Yes, you are correct. The correct first step would be to multiply both sides of the inequality by 4 in order to clear the inequality of fractions.
So the correct first step is:
Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x.
So the correct first step is:
Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x.