Charla wants to cover a rectangular area of her driveway with a picture using chalk. If she completes 23%0D%0A2%0D%0A3%0D%0A of the area in 12%0D%0A1%0D%0A2%0D%0A hour, how long will it take her to complete the entire picture?(1 point)%0D%0AResponses%0D%0A%0D%0A13%0D%0A1%0D%0A3%0D%0A of an hour%0D%0A1 third of an hour%0D%0A%0D%0A12%0D%0A1%0D%0A2%0D%0A of an hour%0D%0A1 half of an hour%0D%0A%0D%0A34%0D%0A3%0D%0A4%0D%0A of an hour%0D%0A3 fourths of an hour%0D%0A%0D%0A1 hour ELPLANE
To find out how long it will take Charla to complete the entire picture, we can use the information given: she completes 23% of the area in 12 1/2 hours.
Since she completes 23% of the area in 12 1/2 hours, it means she completes 1% of the area in 1/2 hours.
Therefore, to complete the entire picture (100% of the area), it will take her 100 times longer. So, it will take her 100 * 1/2 = 50 hours to complete the entire picture.
no emplane
Apologies for the confusion. Let's break down the problem step by step:
Charla completes 23% of the area in 12 1/2 hours.
To find out how long it takes her to complete 1% of the area, we divide 12 1/2 hours by 23.
12 1/2 hours is equivalent to 25/2 hours.
25/2 hours divided by 23 equals approximately 1.09 hours.
Therefore, it takes Charla approximately 1.09 hours to complete 1% of the area.
To complete the entire picture (100% of the area), it will take her 100 times longer. So, the time it will take her to complete the entire picture is approximately 1.09 hours * 100 = 109 hours.
Therefore, it will take Charla approximately 109 hours to complete the entire picture.