Draw the graph of the equations x=3 and 4x=3y in the same graph. Find the area of the triangle formed by these two lines and the x-axis.
Answers
Answer:
1. There are __4_____ quadrants in the graph.
2. The graph of x=a is a straight line parallel to Y - axis
3. A linear equation in two variables has Infinite solutions.
4. Every solution of the linear equation represents a _point____ on the line.
5. The general form of linear equation in two variables is of the form_ax+by+c=0____.
6. The graph of every linear equation in two variables is a _straight_____ line.
7. The line y=3x passes through the___origin____.
8. y= 0 is the equation of the _x-axis_____.
9. (3,2) is a _solution ____ of equation 3x−2y=5.
10. The graph of y=a passes through the point__(0,a)______.
1. Every linear equation in one variable has a unique solution.
TRUE
2. Every point on the line is a solution of the linear equation.
TRUE
3. x=0 is the equation of the x− axis.
FALSE
4. If ax=b is a linear equation, then x=ba is its solution.
FALSE
5. 4x+y=0 is the equation of line passing through (3,2).
FALSE
6. The graph of y=a is a straight line parallel to x− axis.
TRUE
7. x=2,y=−1 is a solution of the linear equation x+2y=4.
FALSE
8. 2√x−3√y−9=0 is a linear equation in one variable.
FALSE
9. An equation of the type y=mx, represents a line passing through the origin. TRUE
10. The graph of the line x=b passes through the point (b,0).
TRUE
Answer:
6 square units
Step-by-step explanation:
here (3,4) is the point where both the lines intersect
