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Find the Cartesian and vector equation of the plane which makes intercepts 1, 1, 1 on the coordinate axes
Concept: Vector and Cartesian Equations of a Line
Find the vector equation of the plane passing through the point A(–1, 2, –5) and parallel to the vectors `4hati - hatj + 3hatk` and `hati + hatj - hatk`.
Concept: Equation of a Plane
Lines `overliner = (hati + hatj - hatk) + λ(2hati - 2hatj + hatk)` and `overliner = (4hati - 3hatj + 2hatk) + μ(hati - 2hatj + 2hatk)` are coplanar. Find the equation of the plane determined by them.
Concept: Coplanarity of Two Lines
Find the length of the perpendicular drawn from the point P(3, 2, 1) to the line `overliner = (7hati + 7hatj + 6hatk) + λ(-2hati + 2hatj + 3hatk)`
Concept: Distance in Lines (Point & Parallel Lines)
Find the vector equation of a line passing through the point `hati + 2hatj + 3hatk` and perpendicular to the vectors `hati + hatj + hatk` and `2hati - hatj + hatk`.
Concept: Vector and Cartesian Equations of a Line
The perpendicular distance of the plane `bar r. (3 hat i + 4 hat j + 12 hat k) = 78` from the origin is ______.
Concept: Equation of a Plane
Minimize `z=4x+5y ` subject to `2x+y>=7, 2x+3y<=15, x<=3,x>=0, y>=0` solve using graphical method.
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
Minimize: Z = 6x + 4y
Subject to the conditions:
3x + 2y ≥ 12,
x + y ≥ 5,
0 ≤ x ≤ 4,
0 ≤ y ≤ 4
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
Solve the following L.P.P graphically:
Maximize: Z = 10x + 25y
Subject to: x ≤ 3, y ≤ 3, x + y ≤ 5, x ≥ 0, y ≥ 0
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
Minimize :Z=6x+4y
Subject to : 3x+2y ≥12
x+y ≥5
0 ≤x ≤4
0 ≤ y ≤ 4
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
Minimum and maximum z = 5x + 2y subject to the following constraints:
x-2y ≤ 2
3x+2y ≤ 12
-3x+2y ≤ 3
x ≥ 0,y ≥ 0
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
A company manufactures bicycles and tricycles each of which must be processed through machines A and B. Machine A has maximum of 120 hours available and machine B has maximum of 180 hours available. Manufacturing a bicycle requires 6 hours on machine A and 3 hours on machine B. Manufacturing a tricycle requires 4 hours on machine A and 10 hours on machine B.
If profits are Rs. 180 for a bicycle and Rs. 220 for a tricycle, formulate and solve the L.P.P. to determine the number of bicycles and tricycles that should be manufactured in order to maximize the profit.
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
Solve the following L. P. P. graphically:Linear Programming
Minimize Z = 6x + 2y
Subject to
5x + 9y ≤ 90
x + y ≥ 4
y ≤ 8
x ≥ 0, y ≥ 0
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
Solve the following LPP by graphical method:
Minimize Z = 7x + y subject to 5x + y ≥ 5, x + y ≥ 3, x ≥ 0, y ≥ 0
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
Maximize: z = 3x + 5y Subject to
x +4y ≤ 24 3x + y ≤ 21
x + y ≤ 9 x ≥ 0 , y ≥0
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
Feasible region is the set of points which satisfy ______.
Concept: Basic Concepts of Linear Programming
Find the graphical solution for the system of linear inequation 2x + y ≤ 2, x − y ≤ 1
Concept: Methods to Solve LPP (Graphical / Corner Point Method)
If `y=cos^-1(2xsqrt(1-x^2))`, find dy/dx
Concept: Derivative of Inverse Function
If `log_10((x^3-y^3)/(x^3+y^3))=2 "then show that" dy/dx = [-99x^2]/[101y^2]`
Concept: Derivatives of Functions in Parametric Forms
Find `dy/dx if y=cos^-1(sqrt(x))`
Concept: Derivative of Inverse Function
