The co-ordinates of the vertices P, Q, R & S of square PQRS inscribed in the triangle ABC with vertices A(0, 0), B(3, 0) & C(2, 1) given that two of its vertices P, Q are on the side AB are respectively
Points A & B are in the first quadrant ; point 'O' is the origin. If the slope of OA is 1, slope of OB is 7 and OA = OB, then the slope of AB is
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If origin and (3, 2) are contained in the same angle of the lines 2x + y – a = 0, x – 3y + a = 0, then 'a' must lie in the interval
A(x1, y1), B(x2, y2) and C(x3, y3) are three non-collinear points in cartesian plane. Number of parallelograms that can be drawn with these three points as vertices are
Three vertices of triangle ABC are A(-1, 11), B(–9, –8) and C(15, -2). The equation of angle bisector of angle A is
If line y – x + 2 = 0 is shifted parallel to itself towards the positive direction of the x-axis by a perpendicular distance of 3√2units, then the equation of the new line is
If the axes are rotated through an angle of 30º in the anti-clockwise direction, the coordinates of point (4, –2√3) with respect to new axes are
Keeping the origin constant axes are rotated at an angle 30º in clockwise direction then new coordinate of (2, 1) with respect to old axes is
If one diagonal of a square is along the line x = 2y and one of its vertex is (3, 0), then its sides through this vertex are given by the equations
The equation 2x2 + 4xy – py2 + 4x + qy + 1 = 0 will represent two mutually perpendicular straight lines, if
One of the diameter of the circle circumscribing the rectangle ABCD is 4y = x + 7. If A and B are the points (–3, 4) and (5, 4) respectively then the area of rectangle is equal to
The co-ordinates of a point P on the line 2x–y+5=0 such that |PA – PB| is maximum where A is (4, –2) and B is (2, –4) will be
The line x + y = p meets the axis of x and y at A and B respectively. A triangle APQ is inscribed in the triangle OAB, O being the origin, with right angle at Q, P and Q lie respectively on OB and AB. If the area of the triangle APQ is 3/8th of the area of the triangle OAB, then AQ/BQ is equal to
Lines, L1 : x + √3y = 2, and L2 : ax + by = 1, meet at P and enclose an angle of 45º between them. Line L3 : y = , also passes through P then
A triangle is formed by the lines 2x – 3y – 6 = 0 ; 3x – y + 3 = 0 and 3x + 4y – 12 = 0. If the points P(a, 0) and Q(0, b) always lie on or inside the DABC, then
The line x + 3y – 2 = 0 bisects the angle between a pair of straight lines of which one has equation x – 7y + 5 = 0. The equation of the other line is
A ray of light passing through the point A(1, 2) is reflected at a point B on the x-axis and then passes through (5, 3). Then the equation of AB is
Let the algebraic sum of the perpendicular distances from the point (3, 0), (0, 3) & (2, 2) to a variable straight line be zero, then the line passes through a fixed point whose co-ordinates are
The pair of straight lines x2 – 4xy + y2 = 0 together with the line x + y + = 0 form a triangle which is
Let Aº (3, 2) and Bº (5, 1). ABP is an equilateral triangle is constructed on the side of AB remote from the origin then the orthocentre of triangle ABP is
The line PQ whose equation is x – y = 2 cuts the x-axis at P and Q is (4, 2). The line PQ is rotated about P through 45º in the anticlockwise direction. The equation of the line PQ in the new position is
Distance between two lines represented by the line pair, x2 – 4xy + 4y2 + x – 2y – 6 = 0 is
The circumcentre of the triangle formed by the lines, xy + 2x + 2y + 4 = 0 and x + y + 2 = 0 is
Area of the rhombus bounded by the four lines, ax ± by ± c = 0 is
If the lines ax + y + 1 = 0, x + by + 1 = 0 & x + y + c = 0 where a, b & c are distinct real numbers different from 1 are concurrent, then the value of + + equals
The area enclosed by 2 | x | + 3| y | < 6 is
The point (4, 1) undergoes the following three transformations successively
(i) Reflection about the line y = x
(ii) Translation through a distance 2 units along the positive direction of x-axis
(iii) Rotation through an angle p/4 about the origin in the counter clockwise direction.
The final position of the points is given by the coordinates