⠀⠀⠀⠀⠀⠀☆☞Diagram☜☆
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[tex]\setlength{\unitlength}{1 cm}\begin{picture}(20,15)\thicklines\qbezier(1,1)(1,1)(6,1)\qbezier(1,1)(1,1)(1,4)\qbezier(1,4)(1,4)(6,4)\qbezier(6,1)(6,1)(6,4)\qbezier(6,4)(6,4)(1,1)\qbezier(1,4)(1,4)(6,1)\put(0.7,0.5){\sf A}\put(6,0.5){\sf D}\put(1.4,4.3){\sf B}\put(6.6,4.3){\sf C}\put(3.4,2){\sf E}\put(1.5,2){\sf x + 11}\put(4.75,3){\sf 6x+1} {\boxed{\bold{X = ??}}}\end{picture}[/tex]
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AnswEr :
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➤ How to solve ?
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For solving such problems we need to recall some rules and properties of quadrilateral .
Above given figure is a figure of an rectangle . We know that the diagonals of an rectangle bisect each other
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Bisect is refer to dividing the line into 2 equal parts .
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From this property of the rectangle ; we can observe in the given rectangle that
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⠀⠀⠀⠀⠀⠀⠀⠀AE = EC
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Solution :
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As , AE = EC
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➠ x + 11 = 6x + 1
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➠ x - 6x = 1 - 11
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➠ -5x = - 10
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➠ 5x = 10
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➠ x = 10/5
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➠ x = 2
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∴ The value of x is 2 .
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