Answer:
The height of the blimp over the football stadium = 161.9 yards
Explanation:
* We will consider that the 3 points construct ΔABC
- To find the height of the blimp over the football stadium,
draw CD perpendicular to AB and intersect it at D
- CD is the height of the blimp over the football stadium
* Now lets think how we will solve the problem
- We have two right triangles ADC and BDC
- The height CD is opposite to angle A of measure 70°
and to angle B of measure 62°
∵ AD + DC = 145 yards
- We can split them ⇒ let AD = x, then BD = 145 - x
∴ AD = x , BD = 145 -x
∵ tanФ = opposite/adjacent
∴ tan(70) = CD/AD and tan(62) = CD/BD
* Make CD as a subject using cross multiplication
∴ CD = AD tan(70) and CD = BD tan(62)
* Now we can equate them
∴ AD tan(70) = BD tan(62)
* Substitute AD and BD by their values
∴ xtan(70) = (145 - x)tan(62) ⇒ open the bracket
∴ xtan(70) = 145 tan(62) - xtan(62) ⇒ collect like terms
∴ xtan(70) + xtan(62) = 145 tan(62) ⇒ take x as a common factor
∴ x[tan(70) + tan(62)] = 145 tan(62) ⇒ divide 2 sides by [tan(70) + tan(62)]
∴ x = [145 tan(62)]/[tan(70) + tan(62)] = 58.922498
∵ AD = x
∴ AD = 58.922498
* Use this value to find the height CD
∵ CD = x tan(70)
∴ CD = 58.922498 × tan(70) = 161.888234
- Proximate the value to the nearest tenth
∵ The hundredth digit is 9
∴ Add the tenth digit by 1
∴ CD = 161.9 ⇒ to the nearest tenth
* The height of the blimp over the football stadium = 161.9 yards