A point P moves in such a way that sum of its perpendicular distances from two perpendicular lines in its plane is always 2 units. Then find the area of region bounded by locus of P .

Question

A point P moves in such a way that sum of its perpendicular distances from two perpendicular lines in its plane is always 2 units. Then find the area of region bounded by locus of P . (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Let x axis and y axis be the two perpendicular lines. Let P be (h , k) Solution

then |h|+|k|=2 So locus of P is ⇒ |x|+|y|=2 Which represents four lines forming a square Solution

Area =4((1/2) ⋅ 2 ⋅ 2)=8 sq. units

Q. A point $P$ moves in such a way that sum of its perpendicular distances from two perpendicular lines in its plane is always $2$ units. Then find the area of region bounded by locus of $P$ .

Let $x$ axis and $y$ axis be the two perpendicular lines. Let $P$ be $(h, k)$

then $∣ h ∣ + ∣ k ∣ = 2$
So locus of $P$ is $\Rightarrow ∣ x ∣ + ∣ y ∣ = 2$
Which represents four lines forming a square

Area $= 4 (\frac{1}{2} \cdot 2 \cdot 2) = 8$ sq. units

Q. A point P moves in such a way that sum of its perpendicular distances from two perpendicular lines in its plane is always 2 units. Then find the area of region bounded by locus of P .

Let x axis and y axis be the two perpendicular lines. Let P be (h,k) then ∣h∣+∣k∣=2 So locus of P is ⇒∣x∣+∣y∣=2 Which represents four lines forming a square Area =4(21​⋅2⋅2)=8 sq. units

Q. A point $P$ moves in such a way that sum of its perpendicular distances from two perpendicular lines in its plane is always $2$ units. Then find the area of region bounded by locus of $P$ .

Let $x$ axis and $y$ axis be the two perpendicular lines. Let $P$ be $(h, k)$

then $∣ h ∣ + ∣ k ∣ = 2$
So locus of $P$ is $\Rightarrow ∣ x ∣ + ∣ y ∣ = 2$
Which represents four lines forming a square

Area $= 4 (\frac{1}{2} \cdot 2 \cdot 2) = 8$ sq. units