Mathematics, 23.09.2020 08:01 desiwill01
A manufacturing company makes two types of water skis, a trick ski and a slalom ski. The trick ski requires labor-hours for fabricating and labor-hour for finishing. The slalom ski requires labor-hours for fabricating and labor-hour for finishing. The maximum labor-hours available per day for fabricating and finishing are and , respectively. Find the set of feasible solutions graphically for the number of each type of ski that can be produced. If x is the number of trick skis and y is the number of slalom skis produced per day, write a system of linear inequalities that indicates appropriate restraints on x and y. Write an inequality for the constraint on fabricating time. Complete the inequality below.
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Mathematics, 21.06.2019 23:50
What is the cube root of -1,000p^12q3? -10p^4 -10p^4q 10p^4 10p^4q
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Mathematics, 22.06.2019 00:40
M? aoc=96 ? space, m, angle, a, o, c, equals, 96, degree \qquad m \angle boc = 8x - 67^\circm? boc=8x? 67 ? space, m, angle, b, o, c, equals, 8, x, minus, 67, degree \qquad m \angle aob = 9x - 75^\circm? aob=9x? 75 ? space, m, angle, a, o, b, equals, 9, x, minus, 75, degree find m\angle bocm? bocm, angle, b, o, c:
Answers: 2
A manufacturing company makes two types of water skis, a trick ski and a slalom ski. The trick ski r...
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