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
subtract 7 from the left side of the equation
subtract 7 from the left side 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
add 7 to both sides of the equation
21 answers
The best first step to solve the equation ax - 7 = 26 would be to add 7 to both sides of the equation.
ill 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
5x - 12 - 6x = -10x + 7 - 1
Step 1: Combine like terms
Step 1: Combine like terms
-12 = -10x + 6x + 7 - 1
Step 2: Get x-terms on the same side of the equation
Step 2: Get x-terms on the same side of the equation
-12 = -4x + 6
Step 3: Get constants on the same side of the equation
Step 3: Get constants on the same side of the equation
-12 - 6 = -4x
Step 4: Get x by itself by using the inverse operation
Step 4: Get x by itself by using the inverse operation
-18 = -4x
Step 1: Combine like terms
Step 1: Combine like terms
-12 = -10x + 6x + 7 - 1
Step 2: Get x-terms on the same side of the equation
Step 2: Get x-terms on the same side of the equation
-12 = -4x + 6
Step 3: Get constants on the same side of the equation
Step 3: Get constants on the same side of the equation
-12 - 6 = -4x
Step 4: Get x by itself by using the inverse operation
Step 4: Get x by itself by using the inverse operation
-18 = -4x
no put each step to the thing
ExAMPLE
STEP 1 (EXAMPLE) = (EQUASION)
ExAMPLE
STEP 1 (EXAMPLE) = (EQUASION)
Step 1: Combine like terms
5x - 12 - 6x = -10x + 7 - 1
Step 2: Get x-terms on the same side of the equation
-12 = -10x + 7 - 1 + 6x
Step 3: Get constants on the same side of the equation
-12 - 6 = -10x + 6x + 7 - 1
Step 4: Get x by itself by using the inverse operation
-18 = -4x + 6x + 6
Note: It seems there was an error in the initial response where it said to get the constants on the same side of the equation, instead of the x-terms. Apologies for the confusion.
5x - 12 - 6x = -10x + 7 - 1
Step 2: Get x-terms on the same side of the equation
-12 = -10x + 7 - 1 + 6x
Step 3: Get constants on the same side of the equation
-12 - 6 = -10x + 6x + 7 - 1
Step 4: Get x by itself by using the inverse operation
-18 = -4x + 6x + 6
Note: It seems there was an error in the initial response where it said to get the constants on the same side of the equation, instead of the x-terms. Apologies for the confusion.
ill 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.
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.
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
5x - 12 - 6x = -10x + 7 - 1
Step 1: Combine like terms
-1x - 12 = -3x + 6
Step 2: Get x-terms on the same side of the equation
-1x + 3x - 12 = -3x + 3x + 6
Step 3: Get constants on the same side of the equation
2x - 12 = 6
Step 4: Get x by itself by using the inverse operation
2x - 12 + 12 = 6 + 12
5x - 12 - 6x = -10x + 7 - 1
Step 1: Combine like terms
-1x - 12 = -3x + 6
Step 2: Get x-terms on the same side of the equation
-1x + 3x - 12 = -3x + 3x + 6
Step 3: Get constants on the same side of the equation
2x - 12 = 6
Step 4: Get x by itself by using the inverse operation
2x - 12 + 12 = 6 + 12
ill in the blanks to follow the steps in solving the equation: 5x−12−6x=−10x+7−1 NOT AN ANSWER
(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.
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.
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
Apologies for the confusion. Here are the correct steps to solve the equation:
Step 1: Combine like terms
5x - 12 - 6x = -10x + 7 - 1
-x - 12 = -10x + 6
Step 2: Get x-terms on the same side of the equation
-x + 10x = 6 + 12
9x = 18
Step 3: Get constants on the same side of the equation
9x = 18
9x - 18 = 0
Step 4: Get x by itself by using the inverse operation
9x - 18 = 0
9x = 18
Step 1: Combine like terms
5x - 12 - 6x = -10x + 7 - 1
-x - 12 = -10x + 6
Step 2: Get x-terms on the same side of the equation
-x + 10x = 6 + 12
9x = 18
Step 3: Get constants on the same side of the equation
9x = 18
9x - 18 = 0
Step 4: Get x by itself by using the inverse operation
9x - 18 = 0
9x = 18
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
WORD BANK (No solution, One solution, Two solutions, Three solutions, Infinite solutions.
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
WORD BANK (No solution, One solution, Two solutions, Three solutions, Infinite solutions.
The number of x's on both sides of the equation is different a≠b - 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 - No solution
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 - Infinite solutions
The number of x's is the same on both sides of the equation, and the constant is different a=b, c1≠c2 - No solution
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 - Infinite solutions
rder the steps for solving the equation: 2x−5=3(4x+5)
(8 points)
2x−5=3(4x+5)
Step 1:
____ (Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ___ (2x = 12x, 2x - 5 = 12x + 15, 2x - 5 = 12x + 5, 2x = 12x + 10,)
Step 2:
___ (Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ()
Step 3:
Property to get
Step 4:
Property to get
(8 points)
2x−5=3(4x+5)
Step 1:
____ (Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ___ (2x = 12x, 2x - 5 = 12x + 15, 2x - 5 = 12x + 5, 2x = 12x + 10,)
Step 2:
___ (Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ()
Step 3:
Property to get
Step 4:
Property to get
Step 1: Distribution Property to get (2x - 5 = 12x + 15)
Step 2: Combine Like Terms (Subtraction) Property to get (2x - 5 = 12x + 5)
Step 3: Combine Like Terms (Subtraction) Property to get (2x - 12x = 5 + 5)
Step 4: Combine Like Terms (Addition) Property to get (-10x = 10)
Step 2: Combine Like Terms (Subtraction) Property to get (2x - 5 = 12x + 5)
Step 3: Combine Like Terms (Subtraction) Property to get (2x - 12x = 5 + 5)
Step 4: Combine Like Terms (Addition) Property to get (-10x = 10)
rder the steps for solving the equation: 2x−5=3(4x+5)
(8 points)
2x−5=3(4x+5)
Step 1:
____ (Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ___
Step 2:
___ (Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ()
Step 3:
(Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ___
Step 4:
(Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ___
(8 points)
2x−5=3(4x+5)
Step 1:
____ (Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ___
Step 2:
___ (Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ()
Step 3:
(Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ___
Step 4:
(Addition of Equality, Subtraction of equality, Combine Like Terms, Distribution, Divison of equality) Property to get ___
Step 1: Distribution Property to get (2x - 5 = 12x + 15)
Step 2: Combine Like Terms (Subtraction) Property to get (2x - 5 = 12x + 15)
Step 3: Combine Like Terms (Subtraction) Property to get (2x - 12x = 15 + 5)
Step 4: Combine Like Terms (Addition) Property to get (-10x = 20)
Step 2: Combine Like Terms (Subtraction) Property to get (2x - 5 = 12x + 15)
Step 3: Combine Like Terms (Subtraction) Property to get (2x - 12x = 15 + 5)
Step 4: Combine Like Terms (Addition) Property to get (-10x = 20)
Solving the inequality for x, which statement shows a good first step and which is the correct solution?
x−6<x4
(2 points)
Responses
Multiply both sides by 4 to clear the inequality of fractions: 4x−24<x
Multiply both sides by 4 to clear the inequality of fractions: 4x−24<x
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
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 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
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x−6<x4
(2 points)
Responses
Multiply both sides by 4 to clear the inequality of fractions: 4x−24<x
Multiply both sides by 4 to clear the inequality of fractions: 4x−24<x
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
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 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
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The correct first step would be to add 6 to both sides of the inequality: x - 6 < x + 4.
The correct solution would be: x < 10.
The correct solution would be: x < 10.
so wich one a b c or d
The correct first step and correct solution are:
First Step: Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x
Correct Solution: x < 6
Therefore, the correct options would be:
First Step: Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x
Solution: x < 6
Option (a): Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x
Option (c): Divide both sides of the inequality by 4 to simplify: x/4 - 3/2 < x
Neither option (b) nor option (d) are correct.
First Step: Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x
Correct Solution: x < 6
Therefore, the correct options would be:
First Step: Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x
Solution: x < 6
Option (a): Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x
Option (c): Divide both sides of the inequality by 4 to simplify: x/4 - 3/2 < x
Neither option (b) nor option (d) are correct.
so whitch one? A, B, C, or D
Sorry for the confusion. Based on the provided options, the correct first step to solve the inequality is:
Option B: Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x.
And the correct solution is:
Option C: x < 6.
Therefore, the correct answer would be Option B for the first step and Option C for the solution.
Option B: Multiply both sides by 4 to clear the inequality of fractions: 4x - 24 < x.
And the correct solution is:
Option C: x < 6.
Therefore, the correct answer would be Option B for the first step and Option C for the solution.
3 answers