A triangle ABC lying in the first quadrant has two vertices as A(1,2) and B(3,1). If &ang;BAC = 90°, and ar(?ABC) = 5√5 sq. units, then the abscissa of the vertex C is: &lt;!-- [if !supportLineBreakNewLine]--&gt; &lt;!--[endif]--&gt;

2 + √5

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Straight Lines Ncert Solutions Maths class 11th Maths Class 11th

A triangle ABC lying in the first quadrant has two vertices as A(1,2) and B(3,1). If ∠BAC = 90°, and ar(?ABC) = 5√5 sq. units, then the abscissa of the vertex C is:

Option 1 -

1 + 2√5

Option 2 -

1 + √5

Option 3 -

2√5 − 1

Option 4 -

2 + √5

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A line passes through (9, 0), making angle 30° with positive direction of x-axis. It is rotated by angle of 15° with respect to (9, 0). Then one of the equation of new line is

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Eqⁿ : y – 0 = tan45° (x – 9) Þ y = (x – 9)

Option (B) is correct

If two circle x² + y² = 4 and x² + y² – 4lx + 9 = 0 intersect at two distinct points, then find the range of l.

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|r₁ – r₂| < c₁c₂ < r₁ + r₂

-> $| 2 - \sqrt[]{4 λ^{2} - 9} | < | 2 λ | < 2 + \sqrt[]{4 λ^{2} - 9}$

$| 2 λ | - 2 < \sqrt[]{4 λ^{2} - 9}$

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$\sqrt[]{4 λ^{2} - 9} > 0$

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$λ \in (- \infty, - \frac{13}{8}) \cup (\frac{13}{8}, \infty)$

Now,

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$4 + 4 λ^{2} - 9 - 4 \sqrt[]{4 λ^{2} - 9} < 4 λ^{2}$

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⇒ $(\frac{- 2}{m} + 8)$

⇒ y-intercept

⇒ (–8m + 2)

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The image of the point (3, 5) in the line x – y + 1 = 0, lies on:

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Kindly consider the following figure

A man is walking on a straight line. The arithmetic mean of the reciprocals of the intercepts of the line on the coordinate axes is $\frac{1}{4} .$ Three stones A, B and C are placed at the point (1, 1), (2, 2) and (4, 4) respectively. Then which of these stones is / are on the path of the man?

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According to question,

$\frac{1}{2} (\frac{1}{a} + \frac{1}{b}) = \frac{1}{4}$

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A triangle ABC lying in the first quadrant has two vertices as A(1,2) and B(3,1). If ∠BAC = 90°, and ar(?ABC) = 5√5 sq. units, then the abscissa of the vertex C is:

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