A researcher approximated the number of cactus plants in a region of desert that is roughly square shaped with a side length of 175 kilometers. As part of the process, he counted the number of cactus plants in a small part of the region and determined that the density of cactus plant was about 214 plants per square kilometer. He assumed the density of cactus plants was the same throughout the region.

Which expression would the researcher have most likely used when making his approximation for the number of cactus plants in the square shaped region

(3 * 10^5) (2 * 10^2)

3 * 10^4 / 2 x 10^2

(3 * 10^4) (2 * 10^2)

3 * 10^5 / 2 * 10^2

Question

Mathematics

Kolby Hoover

2 June, 02:40

A researcher approximated the number of cactus plants in a region of desert that is roughly square shaped with a side length of 175 kilometers. As part of the process, he counted the number of cactus plants in a small part of the region and determined that the density of cactus plant was about 214 plants per square kilometer. He assumed the density of cactus plants was the same throughout the region.

Which expression would the researcher have most likely used when making his approximation for the number of cactus plants in the square shaped region

(3 * 10^5) (2 * 10^2)

3 * 10^4 / 2 x 10^2

(3 * 10^4) (2 * 10^2)

3 * 10^5 / 2 * 10^2

+2

Answers (1)

Know the Answer?

Dakota Newman · Answer 1

The correct answer is C) (3*10⁴) (2*10²)

Explanation:

The total number of cactus plants can be found by multiplying the density of plants (d) by the area (A):

P = d · A

The area of a square can be found by the formula:

A = s²

= (175 km) ²

= 30625 km²

which can be approximated to 3*10⁴ km²

The density of the cactus plants is

d = 214 / km²

which can be approximated to 2*10² / km²

Therefore, the number of plants can be approximated to:

P = d · A

= (2*10² / km²) · (3*10⁴ km ²)

= (2*10²) · (3*10⁴)

Hence, the correct option is C)