The curved surface area of a cylindrical pillar is 176 m? and its volume is 352 m². Find the ratio of its radius to its height. (Use ∏= 22/7)A3:5B4:7C3:4D2:3Answer: B. 4:7 Read Explanation: For a cylinder:Curved Surface Area (CSA) =(2πrh=176)= (2\pi rh = 176)=(2πrh=176)Volume =(πr2h=352)= (\pi r^2 h = 352)=(πr2h=352)Divide volume by CSA:πr2h2πrh=352176\frac{\pi r^2 h}{2\pi rh} = \frac{352}{176}2πrhπr2h=176352r2=2\frac{r}{2} = 22r=2⇒r=4\Rightarrow r = 4⇒r=4Now substitute in CSA:2πrh=1762\pi rh = 1762πrh=1762×227×4×h=1762 \times \frac{22}{7} \times 4 \times h = 1762×722×4×h=1761767×h=176\frac{176}{7} \times h = 1767176×h=176h = 7So, ratio (r : h = 4 : 7)Final Answer: 4 : 7 Read more in App