Justin F.
asked • 08/02/22REDO Math Problem
You are assigned by High School to design a playground as part of your volunteer service. The playground consists of two brands of rope used for ladder assembly. Brand X of rope takes 4 hours to knot and 2 hours to assemble as a ladder. Brand Y of rope takes 6 hours to knot and 10 hours to assemble as a ladder. If you are given exactly 120 hours for knotting and exactly 130 hours for assembly, complete the following questions to determine how many ladders of each type of rope will be ready for playground assembly using all the available time.
Create a system of equations for the situation using x for Brand X of rope and y for Brand Y of rope.
Equation 1:
Equation 2:
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1 Expert Answer
Peter R. answered • 08/02/22
Tutor
5
(7)
Adjunct Lecturer - Math Department - Borough of Manhattan C.C.
Let x = no. ladders with Brand X rope; y = no. ladders with Brand Y rope.
Brand X ladders need 4 hrs to knot, 2 hrs assy.
Brand Y need 6 hrs to knot, 10hrs assy. Given that total knot hours = 120; total assy hrs = 130.
For the knots: 4x + 6y = 120
For assy: 2x + 10y = 130 Can elim x terms by multiplying 2nd eqn by -2.
4x + 6y = 120
-4x - 20y = -260
-14y = -140 y = 10 ladders
You can calculate the no. of x ladders by substituting y = 10 into either of the original eqns and solving for x.
Justin F.
can you graph both equations
Report
08/02/22
Peter R.
tutor
You can draw the two graphs by solving each eqn for the x- and y-intercepts. Set x = 0, solve for y and v.v. For the 1st eqn x-int = 30; y-int = 20. Plot those points and connect with a line. For 2nd eqn, x-int = 65; y-int = 13. The lines cross at the answer.
Report
08/02/22
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Justin F.
Is there an way you can show how to graph both equations08/02/22