PQID: DS50351.01 | OG 2020: Question No. 371
The length, width, and height of a rectangular box, in centimeters, are L, W, and H. If the volume of this box is V cubic centimeters and the total area of the 6 sides of this box is A square centimeters, what is the value of V/A?
- At least 2 of L, W, and H are equal to 5.
- L, W, and H all have the same value.
| Source | OG 2020 |
| PQID | DS50351.01 |
| Type | Data Sufficiency |
| Topic | Geometry |
| Sub-Topic | Rectangular Solids |
| Difficulty | Hard |
Solution
Steps 1 & 2: Understand Question and Draw Inferences
In this question, we are given
- The length, width, and height of a rectangular box, in centimeters, are L, W, and H.
- The volume of this box is V cubic centimeters and the total area of the 6 sides of this box is A square centimeters.
We need to determine
- The value of V/A.
As the given box is a rectangular one, we can say
- Volume V = LWH
- Total area of 6 sides = A = 2(LW + LH + WH)
With this understanding, let us now analyse the individual statements.
Step 3: Analyse Statement 1
As per the information given in statement 1, at least 2 of L, W, and H are equal to 5.
- However, we do not know the exact values of each of them.
Hence, statement 1 is not sufficient to answer the question.
Step 4: Analyse Statement 2
As per the information given in statement 2, L, W, and H all have the same value.
If we assume each of them is equal to ‘a’, then we can write
- V/A = a3/2(3a2) = a3/6a2 = a/6
- Therefore, we need to know the value of ‘a’ to get the answer.
Hence, statement 2 is not sufficient to answer the question.
Step 5: Combine Both Statements Together (If Needed)
Combining information from both statements, we can say
- L = W = H = 5.
As we know the value of each of them, we can determine the value of V/A.
Hence, the correct answer is option C.
Takeaways
- Any rectangular box having dimensions l, w, and h has the same shape as a cuboid. So,
- Volume of the box = l*w*h
- Total surface area of the box = 2(lw + wh + lh)
