Question:
An octagon is inscribed in a circle as shown above. What of the area of the octagon?
- 13+√2
- 13+4√2
- 13+6√2
- 13+12√2
- 13+15√2
“An octagon is inscribed in a circle as shown above. What of the area” - is a subject covered in the GMAT quantitative reasoning section. A student needs to be knowledgeable in a wide range of qualitative skills in order to successfully complete GMAT Problem Solving questions. There are 31 questions in the GMAT Quant section overall. Calculative mathematical problems must be solved in the GMAT quant topics' problem-solving section using appropriate mathematical skills.
Solutions and Explanation
Approach Solution : 1
Area of octagon = [Area of square whose side length is 3+2√2] - (Area of 4 isosceles right angle triangle whose leg is √2)
Area of octagon = \([3+2√2]^2-4*[\frac{1}{2}*√2*√1]^2= 9+8+12√2-4 = 13+12√2\)
Correct Answer: (D)
Approach Solution : 2
If you are having trouble calculating the exact area of the octagon shown above, you can simply estimate it by assuming that it has a side length of 2.5 (notice that 2.5 is used because it is the average of 2 and 3). The claim is that even though a regular octagon with side length 2.5 can also be divided into 8 triangles, each with a base of 2.5, it will have a fairly similar area to the one depicted above. Each of these triangles is a little bit bigger than the triangle above with a base of 2, but a little bit smaller than the triangle above with a base of 3. Thus, they "average" out" in the same general area. In other words, the area of the octagon shown above is roughly equivalent to a regular octagon with side lengths of 2.5.
We can now apply the knowledge that an ordinary octagon with side length s has the following area:
Area = 2s^2 + 2s^2√2
As a result, if s = 2.5, the area would be 2(2.5)^2 + 2(2.5)^2√2 = 12.5 + 12.5√2.
We see that the value in the fourth option which is 13+12√2
is close to the value we got, so it is the right option.
Correct Answer: (D)
Suggested GMAT Problem Solving Samples
- A Zookeeper Counted the Heads of the Animals in a Zoo and Found it to be 80 GMAT Problem Solving
- A Shop Stores x kg of Rice. The First Customer Buys half this Amount Plus half a kg of Rice GMAT Problem Solving
- In a Class of 120 Students Numbered 1 to 120, All Even Numbered Students Opt for Physics GMAT Problem Solving
- Machine A Produces bolts at a Uniform Rate of 120 Every 40 seconds GMAT Problem Solving
- If The Average (arithmetic mean) of The Four Numbers 3, 15, 32, and (N + 1) is 18, then N = GMAT Problem Solving
- Out of 7 Consonants and 4 Vowels, How Many Words of 3 Consonants and 2 Vowels Can be Formed? GMAT Problem Solving
- 4 Bells Toll Together at 9:00 A.M. They Toll After 7, 8, 11 and 12 Seconds GMAT Problem Solving
- 12 Marbles are Selected at Random from a Large Collection of White, Red, Green and Yellow Marbles GMAT Problem Solving
- Find the greatest number that will divide 43, 91 and 183 GMAT Problem Solving
- Of the 150 Houses in a Certain Development GMAT Problem Solving
- The sum of three numbers is 98. If the ratio between first and second be 2:3 and between second and third be 5:8 GMAT Problem Solving
- How Many Three-Letter Words Can be Constructed Using All the 26 Letters of the English Alphabet GMAT Problem Solving
- How Many Litres of Pure Alcohol Must be Added to a 100-litre Solution That is 20 Percent Alcohol GMAT Problem Solving
- For Any Four Digit Number, abcd, *abcd*= (3^a)(5^b)(7^c)(11^d) GMAT Problem Solving
- How Many Five Digit Numbers Can be Formed Using Digits 0, 1, 2, 3, 4, 5, Which Are Divisible By 3 GMAT Problem Solving
- An “Armstrong Number” is an n-Digit Number That is Equal to the Sum of the nth Powers GMAT Problem Solving
- A train crosses a bridge of length 500 m in 40 seconds and a lamp post on the bridge in 15 seconds GMAT Problem Solving
- A Train can Travel 50% Faster than a Car GMAT Problem Solving
- A rectangle is inscribed in a hexagon that has all sides of equal length and all angles of equal measure GMAT Problem Solving
- A Positive Integer Is Divisible by 9 If And Only If The Sum of Its Digits is Divisible By 9 GMAT Problem Solving
Comments