Which equation is equivalent to y=2/3x 3

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Additionally, the band will receive a fixed am Negate the following statements. The key to solving the problem is to notice that the slope moves by 3 points at a time on the x-axis and at the same time the point on the line given to you in the question is 6 points on the x-axis; 3 divides into 6 evenly!

If you reduce the point given to you in the question by 2 groups of 3, then it will be at zero, which is the y-intercept. Since you reduced the x-axis by two groups, you need to reduce the y-axis by two groups, and since each group of the y-axis moves by two, you reduce the y point by four.

C is y intercept. First line's y intercept is -4 , second line is passing through 6 ,7. Second line is 7 units above -4 on y- axis. There are an infinite number of solutions. This method will be illustrated using supply and demand analysis. This type of analysis is derived from the work of the great English economist Alfred Marshall. When graphing price is placed on the vertical axis. Thus price is the dependent variable. It might be more logical to think of quantity as the dependent variable and this was the approach used by the great French economist, Leon Walras.

The objective is to find an equilibrium price and quantity, i. This method involves removing variables from the equations. Variables are removed successively until only a single last variable is left, i.

This equation is then solved for the one unknown. The solution is then used in finding the second to last variable. The procedure is repeated by adding back variables as their solutions are found.

Procedure: eliminate y. The coefficients of y are not the same in the two equations but if they were it would possible to add the two equations and the y terms would cancel out.

However it is possible through multiplication of each equation to force the y terms to have the same coefficients in each equation. Step 1: Multiply the first equation by 2 and multiply the second equation by 3. This gives. Step 2: Add the two equations. Step 3: Solve for y in either of the original equations.