 Hi, and welcome to the session. Let us discuss the following question. The question says, reduce the following equations into slope-intercept form and find their slopes and y intersect. Second part is 6x plus 3y minus 5 is equal to 0. Before solving this question, we should know that equation of straight line in slope-intercept form is given by y is equal to nx plus c, where n is the slope, b is the y-intercept. So always remember that equation of straight line in slope-intercept form is y is equal to nx plus c, where m is the slope, and c is the y-intercept. Let's now begin with the solution. Given equation s plus 3y minus 5 is equal to 0, now 6x plus 3y minus 5 is equal to 0 implies 3y is equal to minus 6 plus 5 is equal to minus 6 by 3 into x plus 5 by 3, and this implies y is equal to minus 2x plus 5 by 3. Equation is of the form x plus c. So this is the slope-intercept form of the given equation. Let's name this equation as equation number 1. Now we will find it slope and y-intercept. On comparing with y is equal to, we find that y-intercept is equal to 5 by 3 in slope-intercept, and it's y-interceptization by intake care.