SOLUTION: Use the five step to solve and show.
The area of a triangular section of a store cannot be more than 910 sq. ft. If the height of the triangular section is 52 ft, what should the
Algebra.Com
Question 403740: Use the five step to solve and show.
The area of a triangular section of a store cannot be more than 910 sq. ft. If the height of the triangular section is 52 ft, what should the base be?
Answer by mananth(16946) (Show Source): You can put this solution on YOUR website!
Height = 52
..
Area of triangle = 1/2 * base * height
Area = 1/2*base*52
1/2*base*52<=910
RELATED QUESTIONS
Use the five steps for problem solving to answer the following question. Please show all... (answered by cleomenius)
The area of a triangular section of a store cannot be more than 910 sq. ft. If the height (answered by stanbon,ewatrrr)
The area of a triangular section of a store cannot be more than 910 sq. ft. If the height (answered by mananth)
The area of a triangular section of a store cannot be more than 910 sq. ft. If the height (answered by MathLover1)
The area of a triangular section of a store cannot be more than 910 sq. ft. If the height (answered by shree840)
the area of the top of a triangular corner desk must be at least 7 sq. ft. if the base of (answered by Gogonati)
The perpendicular sides of a triangular rug measure 6 feet and 9 feet. Calculate the area (answered by Cromlix)
Use an inequality to solve the problem. Be sure to show the inequality and all of your... (answered by jorel1380)
Use an inequality to solve the problem, show the inequality and all of your work. A shop... (answered by cleomenius)