find the slope of the lines which make angle of 45*with the line x-2y=3
Answers
Answered by
3
Answer:
Slope = 1
Step-by-step explanation:
Slope
Slope m = tan theta
Given theta = 45° .
Hence m = tan 45°
⇒ m = 1
Equation
equation of line = y - y₁ = m ( x - x₁ )
= y - y₁ = 1 ( x - x₁ )
= y - y₁ = x - x₁
Given x₁ , y₁ is the point where the line passes through .
Answered by
3
Slope
Slope m = tan theta
Given theta = 45° .
Hence m = tan 45°
⇒ m = 1
Equation
equation of line = y - y₁ = m ( x - x₁ )
= y - y₁ = 1 ( x - x₁ )
= y - y₁ = x - x₁
Given x₁ , y₁ is the point where the line passes through .
hope u understand ❤️❤️
Slope m = tan theta
Given theta = 45° .
Hence m = tan 45°
⇒ m = 1
Equation
equation of line = y - y₁ = m ( x - x₁ )
= y - y₁ = 1 ( x - x₁ )
= y - y₁ = x - x₁
Given x₁ , y₁ is the point where the line passes through .
hope u understand ❤️❤️
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