A line of fixed length a+b moves so that its ends are always on two fixed perpendicular straight lines. Then the locus of the point which divides this line into portions of lengths a and b is a / an

Question

A line of fixed length a+b moves so that its ends are always on two fixed perpendicular straight lines. Then the locus of the point which divides this line into portions of lengths a and b is a / an (A) ellipse (B) parabola (C) straight line (D) none of these

Tardigrade Admin · Accepted Answer

<img class="img-fluid question-image" alt="image" src="https://cdn.tardigrade.in/img/question/mathematics/ba1f656dec4e7a5481691e1d2da2f183-.png" /> Let A B be the line. Let AP = a and PB = b, so the AB = a + b. If AB makes an angle θ with the x-axis and the coordinates of P are ( x , y ), then in Δ APL , x = a cos θ in Δ PBQ , y = b sin θ Therefore, the locus of P ( x , y ) is (x2/a2)+(y2/b2)=1 which is an ellipse.

Q. A line of fixed length a+b moves so that its ends are always on two fixed perpendicular straight lines. Then the locus of the point which divides this line into portions of lengths a and b is a/an

ellipse

parabola

straight line

none of these

Let AB be the line. Let AP=a and PB=b, so the AB=a+b. If AB makes an angle θ with the x-axis and the coordinates of P are (x,y), then in ΔAPL,x=acosθ in ΔPBQ,y=bsinθ Therefore, the locus of P(x,y) is a2x2​+b2y2​=1 which is an ellipse.

Q. A line of fixed length $a + b$ moves so that its ends are always on two fixed perpendicular straight lines. Then the locus of the point which divides this line into portions of lengths a and b is $a / an$