Answer to Question #202771 in Analytic Geometry for tanya

Question #202771

Find the equation of the line which passes through the point (1, √ 3) and makes an angle of 30◦ with the line x− √ 3y + √ 3 = 0

Expert's answer

Write the equation of the line in slope-intercept form

"y=mx+b"

Line

"x-\\sqrt{3}y+\\sqrt{3}=0"

"y=\\dfrac{1}{\\sqrt{3}}x+1"

"slope_1=m_1=\\dfrac{1}{\\sqrt{3}}"

The nagle between two lines

"\\tan \\theta=\\pm\\dfrac{m_2-m_1}{1+m_1m_2}"

Given "\\theta=30\\degree"

"\\tan 30\\degree=\\pm\\dfrac{m_2-m_1}{1+m_1m_2}"

"\\dfrac{1}{\\sqrt{3}}=\\pm\\dfrac{m_2-\\dfrac{1}{\\sqrt{3}}}{1+\\dfrac{1}{\\sqrt{3}}m_2}"

"\\sqrt{3}+m_2=\\pm(3m_2-\\sqrt{3})"

Let

"\\sqrt{3}+m_2=-(3m_2-\\sqrt{3})"

"m_2=0"

The equation of the line which passes through the point "(1, \\sqrt{3})" is

"y=\\sqrt{3}"

Let

"\\sqrt{3}+m_2=(3m_2-\\sqrt{3})"

"m_2=\\sqrt{3}"

Point "(1, \\sqrt{3})"

"\\sqrt{3}=\\sqrt{3}(1)+b=>b=0"

The equation of the line which passes through the point "(1, \\sqrt{3})" is

"y=\\sqrt{3}x"

"y=\\sqrt{3}" or "y=\\sqrt{3}x"

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