Question: Application Heron's Area Formula Let a, b, and c be sides of A B C . Let s equal the semi-perimeter of A B C

Application Heron's Area Formula Let a, b, and c be sides of A B C . Let s equal the "semi-perimeter" of A B C s = a b c 2 The area of A B C is A = s ( s - a ) ( s - b ) ( s - c ) Your friend just bought a triangular plot of land to open a dog daycare center. The lengths of each side of the triangle plot of land is 225 ft, 900 ft, and 850 ft. The warehouse will need to be 11,000 square feet and have 10 parking spaces at 320 square feet each. Will this plot of land be big enough to house the warehouse and 10 parking spaces. Why or Why not? Be sure to show your mathematical equations as proof. Compare the area using Heron's with the area using the formula in lesson 2. Which formula was easier to use? Why? View keyboard shortcuts BoldItalicUnderlineFont Family Arial Comic Sans MS Georgia Roboto Tahoma Times New Roman Verdana Font Size 8 9 10 11 12 14 16 18 24 30 36 48 60 72 96 Text Color

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