The point of the form (a, a) always lies on:(a) On the line x + y = 0(b) On the line y = x(c) x-axis(d) y-axis
Question
The point of the form (a, a) always lies on:
(a) On the line x + y = 0
(b) On the line y = x
(c) x-axis
(d) y-axis
Solution
The point of the form (a, a) means that the x-coordinate and the y-coordinate are the same.
Let's evaluate each option:
(a) On the line x + y = 0 If we substitute x and y with 'a' in this equation, we get a + a = 0, which simplifies to 2a = 0. This is only true when a = 0. So, the point (a, a) does not always lie on this line.
(b) On the line y = x If we substitute x and y with 'a' in this equation, we get a = a, which is always true. So, the point (a, a) always lies on this line.
(c) x-axis The x-axis is the line where y = 0. Since 'a' is not always 0, the point (a, a) does not always lie on the x-axis.
(d) y-axis The y-axis is the line where x = 0. Since 'a' is not always 0, the point (a, a) does not always lie on the y-axis.
So, the correct answer is (b) On the line y = x.
Similar Questions
Y = 0 is theA.Equation of x-axisB.Equation of y-axisC.Both A & BD.None of these
Which point lies on the line described by the equation below?y + 3 = 2(x - 1)A.(2, 9)B.(-1, -6)C.(1, -4)D.(1, -3)E.(0, 0)F.(2, 1)
Which point lies on the line described by the equation below?y + 8 = 4(x - 5)A.(-5, -8)B.(5, 0)C.(5, 8)D.(4, -8)E.(5, -8)F.(4, 5)
The point on X-axis which is equidistant from the points (2, -2) and (-4,2) is(a) (1,0) (b) (2,0) (c) (0,2) (d) (-1,0)
Which point lies on the line described by the equation below?y + 4 = 4(x - 3)A.(-2, 3)B.(1, 11)C.(3, -4)D.(2, 9)E.(0, 0)F.(1, -11)
Upgrade your grade with Knowee
Get personalized homework help. Review tough concepts in more detail, or go deeper into your topic by exploring other relevant questions.