The area of the part of the tablecloth that hangs over the table is 285 square inches
Step-by-step explanation:
In order to find the area of table cloth that hangs over the table, we have to find the area of table and the total area of table cloth.
Given
Area of table =
To find the side of the square
Taking Square root on both sides
When the table cloth is hanged, 3 inches are left to hang over this means that the side will now be: 46+3 = 49 inches
The area of table cloth =
The area of table cloth that will be hung over the table is:
Hence,
The area of the part of the tablecloth that hangs over the table is 285 square inches
Keywords: Square, side
Learn more about square at:
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The net force acting on the crate is the sum of all the forces acting in the different directions on the crate, which is 176 N to the left.
<h3>What is net force?</h3>
The net force is defined as the sum of all the forces acting on an object.
From the figure given that,
Upward force = 440 N
Downward force = - 440 N
Rightward force = 176 N
Leftward Force = - 352 N
The net vertical force acting on the crate = Upward force + Downward force
= 440 N + (-440 N)
= 0 N
The net horizontal force acting on the crate = Rightward force + Leftward force
=176 N + (- 352 N)
= - 176 N
Hence, the net force acting on the crate is - 176 N, which is 176 N to the left.
To learn more about the net force from the given link:
brainly.com/question/24855755
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Answer:2:5
Step-by-step explanation: 5 days rain and 2 days didn't rain
2:5
<h3><u>
Answer:</u></h3>
<h3><u>
Step-by-step explanation:</u></h3>
- 2/5(x − 9/10) = −2 3/4
- => 2x/5 - 18/50 = −2 3/4
- => 2x/5 - 18/50 = −11/4
- => 40x/100 - 36/100 = -275/100
- => 40x/100 = -239/100
- => 40x = -239
- => x = -239/40
- => x = -5 39/40
<h3><u>Conclusion:</u></h3>
Hence, x = -5 39/40 is the answer.
Hoped this helped.
Answer ∠DEG: 54°
Answer ∠GEF: 36°
Step 1: Write your equation
This question is asking you to determine the measurement of two angles. To begin, you must first solve for x. By looking at ∠DEH, you can see that these angles should equal 90°, since ∠DEF is equal to ∠DEH. Let’s solve for x by writing an equation using the information above. Add the two given angles and equal them to 90 degrees.
6x+4x=90
Step 2: Solve for x
To find the degrees we must first solve our created equation. We need to combine like terms then divide to get x alone.
6x+4x=90
10x=90
x=9
Step 3: Substitute x to find the degree of each angle
The last step will be the most simple. Substitute x into each angle to solve.
6x= 6(9) = 54°
∠DEG= 54°
4x= 4(9)= 36°
∠GEF= 36°
These are your answers! You can check that they are right by adding them, and ensuring that they equal 90°.
Hope this helps! Comment below for more questions.