The area of the triangle formed by the intersection of a line parallel to x-axis and passing through P(h, k), with the lines y = x and x + y = 2 is h2. The locus of the point P is

Question

The area of the triangle formed by the intersection of a line parallel to x-axis and passing through P(h, k), with the lines y = x and x + y = 2 is h2. The locus of the point P is (A) x = y - 1 (B) x = - (y - 1) (C) x = 1 + y (D) x = - (1 + y)

Tardigrade Admin · Accepted Answer

Given, ar( triangle ABC) = h2 <img class="img-fluid question-image" alt="image" src="https://cdn.tardigrade.in/img/question/mathematics/ba21adb8b67b7948a2e8e1d3e4421266-.png" /> ⇒ (1/2)|1 1 1 k k 1 2-k k 1|=± h2 ⇒ 1(k-k)-1(k-2+k)+1(k2-2 k+k2)=± 2 h2 ⇒ -(2 k-2)+(2 k2-2 k)=± 2 h2 ⇒ 2-2 k+2 k2-2 k=± 2 h2 ⇒ 2 k2-4 k+2=± 2 h2 ⇒ k2-2 k+1=± h2 Hence, locus of a point is ⇒ (k-1)2=h2 y-1=± x ⇒ x = y - 1 or x=-(y-1)

Q. The area of the triangle formed by the intersection of a line parallel to x-axis and passing through P(h,k), with the lines y=x and x+y=2 is h2. The locus of the point P is

x = y - 1

x = - (y - 1)

x = 1 + y

x = - (1 + y)

Given, ar(△ABC)=h2 ⇒21​∣∣​1k2−k​1kk​111​∣∣​=±h2 ⇒1(k−k)−1(k−2+k)+1(k2−2k+k2)=±2h2 ⇒−(2k−2)+(2k2−2k)=±2h2 ⇒2−2k+2k2−2k=±2h2 ⇒2k2−4k+2=±2h2 ⇒k2−2k+1=±h2 Hence, locus of a point is ⇒(k−1)2=h2 y−1=±x ⇒x=y−1 or x=−(y−1)

Q. The area of the triangle formed by the intersection of a line parallel to $x$ -axis and passing through $P (h, k)$ , with the lines $y = x$ and $x + y = 2$ is $h^{2}$ . The locus of the point $P$ is