Slope of a line parallel to y-axis is;
The points $(7, 9), (3, -7)$ and $(-3, 3)$ are the vertices of
The inclination of any line parallel to y-axis is
If $\overline{AB}:\overline{BC}=2:3$ then point C divides the line segment $AB$ externally in ratio
The area of the triangle formed by the lines $7x-y-10=0$, $10x+y-41=0$ and $3x+2y+3=0$ is;
The measure of the angle from the first line to the second line whose slopes are $0$ and $3$, is;
Joint equation of lines through the origin and perpendicular to the lines $x^2+xy-6y^2=0$
Distance of the point $(-7,13)$ from the line $2x+y+13=0$ is;
The matrix form of the system of linear equations; $3x+4y-7=0$ , $2x-5y+8=0$ , $x+y-3=0$
Point of intersection of pair of lines $7x+2y=6$ and $3x+y=0$;
The equation of line through $(x_2, y_2)$ perpendicular to the line $px+qy+r=0$ is;
Two lines are parallel if and only if they have same;
The points $(4, -2), (-2, 4)$ and $(5, 5)$ are the vertices of a triangle. Then the coordinates of the in centre of the triangle are _______ ?
$y=-\frac{17}{9}x+\frac{37}{9}$ is _______ form equation $9y+17x-37=0$.
The distance between the parallel lines $4x+3y-2=0$ and $4x+3y+8=0$ is;
If a line passes through points $(4,3)$ and $(2,\lambda)$ will be shifted into;
Equation of line having slope 3 making x-intercept 5 is
Which pair of line are $\perp$ to each other?
The slope formula is given by;
The average entry test score of engineering candidates was 592 in the year 1998, while the score was 564 in 2002. assuming that the relationship between time and score is linear, then the average score in the year 2006 will be;
The xy-coordinates are rotated about origin at an angle $180^o$ , then the coordinates of the point $P(4,-1)$ are;
Any equation of first degree in x and y represents a;
Centroid of a triangle with vertices $A(2, 3), B(-1, 6)$ and $C(7, 5)$ is
Which point is above the line $\frac{4}{3}x+y=1?$
The measure of the angle $\theta$ from the line $p_1x+q_1x+r_1=0$ to the line $p_2x+q_2y+r_2=0$, is given by $\tan{\theta}$=______;
The equation of the line through the points $(2,4)$ and $(7,1)$ is;
The equation of line through $(-3, 5)$ and $\perp$ to line $x+2y+3=0$ is;
$A(0,b), B(0,0)$ and $C(a,0)$ are vertices of a triangle. Its median AD and mutually perpendicular if;
Find $'b'$ if the line through $(3,4)$ and $(-1,b)$ is parallel to the line through $(2,3)$ and $(-4,1)$.
The equation of the straight line through the point of intersection of $16x-10y-33=0, 12x+14y+29=0$ and the intersection of $x-y+4=0, x-7y+2=0$ is;
The vertices of a $\triangle \, ABC$ are $(2,2), (-4,-4)$ and $(5,-8)$ respectively, the length of the median through C is_________
Slope of line parallel to $x-axis$ is;
The points $(5,-2), (1,2), (-2,5)$ are;
Directed between the lines $4x+3y=11$ and $ 8x+6y=15$ is _________.
If the gradient of the line passing through $A(3,2)$ is $\frac{3}{4}$, the points on the at a distance 5 units from A are;
Which is the intercept form of the equation $px+qy+r=0$?
Equation of hypotenuse $\overline{AB}$ of length $\sqrt{2}$ in isosceles $\triangle \, OAB$ is
The line segment joining by the points $(-3,-4)$ and $(1,-2)$ is divide by y-axis in the ratio
The inclination of the x-axis is;
The equation of the line through the point $(-2,1)$ and the point of interaction of the lines $4x+3y-1=0$ and $2x-6y+5=0$ is;
If the sum of the distances of a point from two $\perp$ lines is 1 then the locus is ___-
