The number of integral values of x satisfying the inequation |x| < 4 is

Updated On: Aug 5, 2024

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The Correct Option is A

Solution and Explanation

The correct option is (A):7.

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For the system of linear equations
\(x+y+z=6\)
\(\alpha x+\beta y+7 z=3\)
\(x+2 y+3 z=14\).
which of the following is NOT true ?
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If [x+6]+[x+3] ≤ 7 and let call its solution as set A and set B is the solution of inequality 3^5x-8 < 3^-3x.
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Let α,β, and γ be real numbers. Consider the following system of linear equations:
x + 2y + z = 7
x + αz = 11
2x - 3y + βz = γ
Match each entry in List I to the correct entries in List II

List I		List II
(P)	If β=\(\frac{1}{2}\)(7α - 3) and \(\gamma\)=28, then the system has	(1)	a unique solution
(Q)	If β=\(\frac{1}{2}\)(7α - 3) and \(\gamma\)\(\neq\)28, then the system has	(2)	no solution
(R)	If β\(\neq\)\(\frac{1}{2}\)(7α - 3) where \(\alpha\)=1 and \(\gamma\)\(\neq\)28, then the system has	(3)	infinitely many solutions
(S)	If β\(\neq\)\(\frac{1}{2}\)(7α - 3) where \(\alpha\)=1 and \(\gamma\)=28, then the system has	(4)	x = 11, y = - 2 and z = 0 as a solution
		(5)	x = -15 , y = 4 and z = 0 as a solution

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