Question
If a linear equation has one variable, what is it called?
- Linear equation in one variable
- Linear equation in two variables
- Both a and b
- None of the above
Hint:
An equation is said to be linear if the maximum power of the variable is consistently 1. Another name for it is a one-degree equation. A linear equation with one variable has the conventional form Ax + B = 0.
Here we have asked what is a linear equation that has one variables.
The correct answer is: Linear equation in one variable
An equation that has two variables and the highest power of the variables is 1 is called linear equation in two variables.
The equation for a linear equation in one variable is written as ax+b = 0, where a and b are two integers, and x is a variable. This equation has only one solution. For instance, the linear equation 2x+7=0 only has one variable.
The following procedures are used to solve an equation with a single variable.
Clear any fractions using the LCM in step one.
Simple all sides of the equation in step two.
Isolate the variable in step three.
Finally, check your response.
So the answer is a Linear equation in one variable.
Here the concept of Linear equations and Linear equations in two variables were used. There is only one distinct solution for each linear equation with one variable. So the answer is Linear equation in One variable.
Related Questions to study
If a linear equation has two variables, what is it called?
Here the concept of Linear equations and Linear equations in two variables were used. Two or more equations with the same solution make up a system of linear equations. Each equation in a system of linear equations can be represented by a straight line, and the intersection of two or more such lines is the solution.
If a linear equation has two variables, what is it called?
Here the concept of Linear equations and Linear equations in two variables were used. Two or more equations with the same solution make up a system of linear equations. Each equation in a system of linear equations can be represented by a straight line, and the intersection of two or more such lines is the solution.
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How many solutions does the system of linear equations have?
y = -2x + 4 and 7y = -14x + 28
So here we have given two equations, y = -2x + 4 and 7y = -14x + 28 and we had to find out how many solutions it have. Using the concept we found out that the system is having intersecting lines and hence it has an infinite number of solution.
How many solutions does the system of linear equations have?
y = -2x + 4 and 7y = -14x + 28
So here we have given two equations, y = -2x + 4 and 7y = -14x + 28 and we had to find out how many solutions it have. Using the concept we found out that the system is having intersecting lines and hence it has an infinite number of solution.
How many solutions do the following equations have?
y = -6x + 8 and y = -3x – 4
So here we have given two equations, y = -6x + 8 and y = -3x – 4 and we had to find out how many solutions it have. Using the concept we found out that the system is having intersecting lines and hence it has 1 solution.
How many solutions do the following equations have?
y = -6x + 8 and y = -3x – 4
So here we have given two equations, y = -6x + 8 and y = -3x – 4 and we had to find out how many solutions it have. Using the concept we found out that the system is having intersecting lines and hence it has 1 solution.
How many solutions do the following equations have?
x + y = -2 and 3x + 3y = -6
So here we have given two equations, x + y = -2 and 3x + 3y = -6 and we had to find out how many solutions it have. Using the concept we found out that the system is having coinciding lines and hence it has an infinite number of solutions.
How many solutions do the following equations have?
x + y = -2 and 3x + 3y = -6
So here we have given two equations, x + y = -2 and 3x + 3y = -6 and we had to find out how many solutions it have. Using the concept we found out that the system is having coinciding lines and hence it has an infinite number of solutions.
How many solutions do the following equations have?
y = x + 3 and y = x + 1
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How many solutions do the following equations have?
y = x + 3 and y = x + 1
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How many solutions do the following equations have?
y = x + 4 and y = –x + 6
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How many solutions do the following equations have?
y = x + 4 and y = –x + 6
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How many solutions do equations have when they overlap with each other?
So here we were asked how many solutions the equations have when they are coinciding, so we used the concept of linear equations and understood with an example that when two lines are coinciding with each other, there are infinite number of solutions.
How many solutions do equations have when they overlap with each other?
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How many solutions that the equations have when they are parallel?
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How many solutions that the equations have when they are parallel?
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How many solutions that the equations have when they intersect at a point?
So here we were asked how many solutions that the equations have when they intersect at a point, so we used the concept of linear equations and understood that when two lines intersect at a point, there is only one solution.
How many solutions that the equations have when they intersect at a point?
So here we were asked how many solutions that the equations have when they intersect at a point, so we used the concept of linear equations and understood that when two lines intersect at a point, there is only one solution.
If x = a, y = b is the solution of the equations x + y = 5 and 2x – 3y = 4, then the values of a and b are respectively
If x = a, y = b is the solution of the equations x + y = 5 and 2x – 3y = 4, then the values of a and b are respectively
Who is the father of linear equations in two variables?
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What is the y value in the equation 2x + 6y = 12?
What is the y value in the equation 2x + 6y = 12?
What is the y value in the equation x + y = 1?
What is the y value in the equation x + y = 1?
What is the y value in the equation -3x + 6y = 18?
Solve , equation for y .
What is the y value in the equation -3x + 6y = 18?
Solve , equation for y .
