1- If the lines [i]g [/i]and [i]h[/i] are parallel, then the value of [i]x[/i] in the figure below is:[br][br][br][br] [img width=259,height=197]data:image/png;base64,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[/img]

2- Lines [i]f[/i] and [i]g[/i] are parallel. Based on that assumption, determine x and y. [br][img]data:image/png;base64,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[/img]

3- Lines [i]f[/i] and [i]g[/i] are parallel. Based on that assumption,  determine x and y. [br] 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[/img]

4 (Dolce & Pompeu) - The sum of the acute angles formed by two parallel lines cut by a transversal is equal to 80º. Determine the obtuse angle.

5-Determine the value of x in the following figure.[br][br] [img width=294,height=235]data:image/png;base64,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[/img]

6-Determine the value of x in the following figure.[br][br] [img]data:image/png;base64,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[/img]

7-Determine the value of x in the following figure.[br][br] [img]data:image/png;base64,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[/img]

8-Determine the value of [math]\ \hat{A} [/math] and [math]\ \hat{B} [/math] angles in the following figure.[br][br] [img width=472,height=218]data:image/png;base64,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[/img]