Since the scale drawing represents the greatest length of the table as 1.5 feet, we can set up proportions to find the lengths of the other sides:
1.5 feet = 3 feet
x = 3 feet
Therefore, the length of the other sides of the table in decimal form would be:
Both sides: 3 feet = 3 feet
Top side: 3 feet = 3 feet
Bottom side: 6 feet = 6 feet
So, the lengths of the other sides of the table would be 3 feet for both sides, 3 feet for the top side, and 6 feet for the bottom side.
The image shows a table at a restaurant in the shape of a trapezoid. The restaurant owners want to determine if trapezoidal tables will fit comfortably into the rest of the dining room. The owners make a scale drawing of the dining room and a scale drawing of the table. If the greatest length of the table is represented in the scale drawing by 1.5 feet, what will the length of the other sides of the table be? Write your answer in decimal form. (1 point)
the trapezoids sides are:
both sides are 3.
top side is 3.
bottom side is 6.
8 answers
WRONG
I apologize for the error in my previous response. Let's correct that:
Since the scale drawing represents the greatest length of the table as 1.5 feet, and the longest side of the trapezoid is 6 feet, we have the following proportions:
1.5 feet = 6 feet
x = 3 feet
Using the above proportions, the lengths of the other sides of the trapezoid table in decimal form are:
Both sides: 3 feet = 3 feet
Top side: 3 feet = 3 feet
Bottom side: 6 feet = 6 feet
Therefore, the lengths of the other sides of the table are 3 feet for both sides, 3 feet for the top side, and 6 feet for the bottom side.
Since the scale drawing represents the greatest length of the table as 1.5 feet, and the longest side of the trapezoid is 6 feet, we have the following proportions:
1.5 feet = 6 feet
x = 3 feet
Using the above proportions, the lengths of the other sides of the trapezoid table in decimal form are:
Both sides: 3 feet = 3 feet
Top side: 3 feet = 3 feet
Bottom side: 6 feet = 6 feet
Therefore, the lengths of the other sides of the table are 3 feet for both sides, 3 feet for the top side, and 6 feet for the bottom side.
INCORRECT
I apologize for the repeated error in my responses. Let's correct that once again:
Given that the greatest length of the trapezoid table in the scale drawing is represented as 1.5 feet and the actual length of this side is 6 feet, we can set up the following proportions:
1.5 feet in scale = 6 feet actual
x in scale = 3 feet actual
Now, we can find the lengths of the other sides of the table in decimal form by setting up the proportions:
1.5 feet in scale = 6 feet actual
x in scale = y in actual
Using the scale factor of 1.5 feet in the scale drawing corresponds to 6 feet in actual length, we can find the lengths of the other sides:
Both sides = (1.5/6) * 3 = 0.75 feet
Top side = (1.5/6) * 3 = 0.75 feet
Bottom side = (3/6) * 3 = 1.5 feet
Therefore, the lengths of the other sides of the table in decimal form will be:
Both sides: 0.75 feet
Top side: 0.75 feet
Bottom side: 1.5 feet
Given that the greatest length of the trapezoid table in the scale drawing is represented as 1.5 feet and the actual length of this side is 6 feet, we can set up the following proportions:
1.5 feet in scale = 6 feet actual
x in scale = 3 feet actual
Now, we can find the lengths of the other sides of the table in decimal form by setting up the proportions:
1.5 feet in scale = 6 feet actual
x in scale = y in actual
Using the scale factor of 1.5 feet in the scale drawing corresponds to 6 feet in actual length, we can find the lengths of the other sides:
Both sides = (1.5/6) * 3 = 0.75 feet
Top side = (1.5/6) * 3 = 0.75 feet
Bottom side = (3/6) * 3 = 1.5 feet
Therefore, the lengths of the other sides of the table in decimal form will be:
Both sides: 0.75 feet
Top side: 0.75 feet
Bottom side: 1.5 feet
there is only one answer.... PICK ONE
My apologies for the confusion. Let me correct the response:
Both sides will be 0.75 feet.
Both sides will be 0.75 feet.
its 0.75