Question

The equation of a line through (1,1) and making an inclination 45° with x- axis is

Answer 1

Answer:

I don't know because I am a small child

Answer 2

SOLUTION

TO DETERMINE

The equation of a line through (1,1) and making an inclination 45° with x- axis

EVALUATION

The required line passes through the point (1,1)

Let the required equation of the line is

$\sf{(y - 1) = m(x - 1)} \: \: \: - - - - (1)$

Where m = Slope of the line

Since the line makes an inclination 45° with x- axis

∴ m = tan 45° = 1

Hence the required equation of the line is

$\sf{(y - 1) = 1(x - 1)}$

$\sf{ \implies \: (y - 1) = (x - 1)}$

$\sf{ \implies \: y - 1 - x + 1 = 0}$

$\sf{ \implies \: y - x = 0}$

$\sf{ \implies \: x - y = 0}$

━━━━━━━━━━━━━━━━

Learn more from Brainly :-

$1.$ Find the point where the graph of 0.25x + 0.05y =1.00 intersects the y-axis:

https://brainly.in/question/26332017

2. Find the equation of straight line passing through the point (-4,5) and making equal intercepts on the coordinate axis.

https://brainly.in/question/25257443

3. Find the slope of the line perpendicular to the line AB, if A is (3, 3) and B is (-1, 1)

https://brainly.in/question/27031626