 Second part is y by 5 minus 10. Let's now begin with the solution. Clearly, the given equation minus y by 5 minus 10 is already in the form vy equals to 0. On comparing a c equals to 0 to 0 we find 1 by 5 and c z minus y by 5 minus 10 is equal to 0 where 1 by 5 and c is equal to minus 10. This completes the second part, y is equal to 6. Let's now begin with the solution. Now the equation minus 2 is vy plus c equals to 0, x to 0, red minus 3 and c is equal to 0. This is equal to minus 5 pi. Let's now begin with the solution. Now the given equation 2x is equal to minus 5 pi, can be written as is equal to 0. Clearly this equation is in the form ax plus vy plus c is equal to 0. On comparing plus vy plus c is equal to 0 plus 5 pi plus 0 is equal to 0. We find that c is equal to 2, b is equal to 5 and c is equal to 0. Therefore, a required answer is 2x plus 0 is equal to 0 where a is equal to 2, b is equal to 5 and c is equal to 0. So this completes the third part to 0. Let's now begin with the solution. Now the given equation 3x plus 2 equals to 0 can be written as this, we can write y as 0 into y. So 3x plus 2 equals to 0 can be written as 3x plus 0 into y plus 2 equal to 0. Clearly this equation is in the form ax plus vy plus c equals to 0. On comparing x plus vy plus c equals to 0 with this equation we find that a is equal to 3, b is equal to 0 and c is equal to 2. Therefore, our required answer is 3x plus 0 into y plus 2 is equal to 0 where a is equal to 3, b is equal to 0 and c is equal to 2. This completes the sixth part. Seventh part is y minus 2 is equal to 0. Let's now begin with the solution. Now the given equation y minus 2 is equal to 0 can be written as variable x is not present here. So we can write x as 0 into x plus we can write y as 1 into y minus 2 equals to 0. Clearly this equation is in the form ax plus vy plus c equals to 0. On comparing x plus vy plus c equals to 0 with this equation we find that a is equal to 0, b is equal to 1 and c is equal to minus 2. Therefore, our required answer is 0 into x plus 1 into y minus 2 is equal to 0 where a is equal to 0, b is equal to 1 and c is equal to minus 2. This completes the seventh part. Eighth part is 5 is equal to 2x. Let's now begin with the solution. The equation 5 is equal to 2x can be written as minus 2x plus variable y is not present here. So we can write y as 0 into y minus 5 equals to 0. Clearly this equation is in the form ax plus vy plus equals to 0. On comparing x plus vy plus c equals to 0 with this equation we find that a is equal to minus 2, b is equal to 0 and c is equal to minus 5. Therefore, our required answer is minus 0 into y plus 5 is equal to 0 where a is equal to minus 2, b is equal to 0 and c is equal to 5. This completes the session 5 and take care.