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Without using truth table prove that (p ∧ q) ∨ (∼ p ∧ q) v (p∧ ∼ q) ≡ p ∨ q
Concept: Algebra of Statements
Simplify the given circuit by writing its logical expression. Also, write your conclusion.
Concept: Application of Logic to Switching Circuits
Construct the truth table for the statement pattern:
[(p → q) ∧ q] → p
Concept: Logical Connective, Simple and Compound Statements
The dual of statement t ∨ (p ∨ q) is ______.
Concept: Duality
Apply the given elementary transformation of the following matrix.
A = `[(1,0),(-1,3)]`, R1↔ R2
Concept: Elementry Transformations
If A = `[("x",0,0),(0,"y",0),(0,0,"z")]` is a non-singular matrix, then find A−1 by using elementary row transformations. Hence, find the inverse of `[(2,0,0),(0,1,0),(0,0,-1)]`
Concept: Elementry Transformations
Find the inverse of A = `[("cos" theta, -"sin" theta, 0),("sin" theta, "cos" theta, 0),(0,0,1)]` by elementary row transformations.
Concept: Elementry Transformations
Express the following equations in matrix form and solve them by the method of reduction:
x − y + z = 1, 2x − y = 1, 3x + 3y − 4z = 2
Concept: Application of Matrices
The value of x, y, z for the following system of equations x + y + z = 6, x − y+ 2z = 5, 2x + y − z = 1 are ______
Concept: Applications of Determinants and Matrices
If A = `[(-2, 4),(-1, 2)]` then find A2
Concept: Elementry Transformations
Find the matrix X such that AX = I where A = `[(6, 17),(1, 3)]`
Concept: Elementry Transformations
Transform `[(1, 2, 4),(3, -1, 5),(2, 4, 6)]` into an upper triangular matrix by using suitable row transformations
Concept: Applications of Determinants and Matrices
Solve the following by inversion method 2x + y = 5, 3x + 5y = −3
Concept: Applications of Determinants and Matrices
Three chairs and two tables cost ₹ 1850. Five chairs and three tables cost ₹2850. Find the cost of four chairs and one table by using matrices
Concept: Applications of Determinants and Matrices
Find the inverse of A = `[(2, -3, 3),(2, 2, 3),(3, -2, 2)]` by using elementary row transformations.
Concept: Elementry Transformations
Solve the following system of equations by the method of inversion.
x – y + z = 4, 2x + y – 3z = 0, x + y + z = 2
Concept: Application of Matrices
Solve the following system of equations by the method of reduction:
x + y + z = 6, y + 3z = 11, x + z = 2y.
Concept: Application of Matrices
If `sin^-1(1-x) -2sin^-1x = pi/2` then x is
- -1/2
- 1
- 0
- 1/2
Concept: Inverse Trigonometric Functions
In Δ ABC with the usual notations prove that `(a-b)^2 cos^2(C/2)+(a+b)^2sin^2(C/2)=c^2`
Concept: Solutions of Triangle
In any ΔABC if a2 , b2 , c2 are in arithmetic progression, then prove that Cot A, Cot B, Cot C are in arithmetic progression.
Concept: Solutions of Triangle
