Why is a square also a rhombus?
Answers
Answer:
A square is a quadrilateral with all sides equal in length and all interior angles right angles. Thus a rhombus is not a square unless the angles are all right angles. A square however is a rhombus since all four of its sides are of the same length.
Step-by-step explanation:
Hope thats helpful! :)
you can find the answer to this by looking at the properties of both shapes. a rhombus has Opposite sides that are parallel, Adjacent angles are supplementary, All the four sides are equal, and all 4 sides bisect forming right angles. a square also has these properties therefore a square can classify as a rhombus. but be careful, just because a square is a rhombus, it doesn't always necessary mean that a rhombus is always a square
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Answers
Here is a real world problem to demonstrate this.
Mack decides to burn some calories, so he attends a gym. A cost of a gym costs 10 dollars per month, with an addition registration fee of 30 dollars. Mack has spent 100 dollars on the gym so far. How many months has he been participating at the gym?
Let 'x' represent the amount of months spent.
Saturday night after the marshmallows ran out, the counselor
threw 30 cold stones on the campfire, and sent the campers
to bed in their tents.
But several campers noticed that there were still live coals in
the fire. This was a tent situation, and they knew that they
should not leave until it's completely out. So they each
picked up 10 cold stones and they all threw those on the fire
too. Then the fire was really out, so they all went to their tents.
In the morning the same campers who threw 10 stones apiece
onto the fire all got together and went to look at it. It was definitely
stone cold, so they spread it out and counted all the stones in it.
They found that there were exactly 100 stones. How many
campers threw stones on the fire after the counselor left ?
range:
mode:
Answers
Answer:
range=5
mode=6
Step-by-step explanation:
range means the max - min
6-1 = 5
mode means the most frequent number
6
Answer:
Range: 5 Mode: 6
Step-by-step explanation:
Answers
The reason is simple, all you need to do is 7 x 3, and 5 x 3, giving you the l x w of 15 and 21 inches. You multiply these numbers together, meaning the original length and width (l x w), which would be 5 and 7, which equals 35.
From here, you multiply 15 and 21, which gives you 315.
Divide 35 from 315, and see what you get!
Hope this helps!
Answers
Mrs Hamilton received 67.5% of the agency fee made from selling the $175000 house
What is an equation?
An equation is an expression that shows the relationship between two or more numbers and variables.
The house was sold for $175,000. The agency's fee for the sale was 4% of the sale price.
Agency = 4% of 175000 = $7000
Mrs. Hamilton received $4,725. Hence:
Percentage = (4725/7000) * 100% = 67.5%
Mrs Hamilton received 67.5% of the agency fee made from selling the $175000 house
Find out more on equation at: brainly.com/question/2972832
First you have to figure out what the agency received as a whole:
175,000 x .04 = 7000
Then you have to figure out what percentage Mrs. Hamilton received from the agency
.675 as a percentage is equal to 67.5%!
I hope this helped!
Answers
Answers
Hello from MrBillDoesMath!
Answer:
b2 = 5
Discussion:
A = 1/2 h (b1 + b2).
Substituting A = 16, h = 4, and b1=3 in the above formula gives:
16 = (1/2) (4)( 3 + b2) => (as (1/2)4 = 2) )
16 = 2 ( 3 + b2) => (divide both sides by 2)
8 = (3 + b2) => (subtract 3 from both sides)
8-3 = b2 =>
5 = b2
Check Area formula:
Does A = 16 = (1/2)(4)(3+5) ?
Does 16 = (1/2) (4)(8) ?
Does 16 = (1/2)(32) ? Yes it does so our calculation for b2 is correct
Thank you,
MrB
Final answer:
To solve for b2, substitute the given values (A = 16, h = 4, and b1 = 3) into the equation and solve for b2. The value of b2 is 5.
Explanation:
To solve for b2 in the equation A = 1/2 h (b1 + b2), where A = 16, h = 4, and b1 = 3, we can substitute the given values into the equation and solve for b2.
A = 1/2 * 4 * (3 + b2)
16 = 2 * (3 + b2)
16 = 6 + 2b2
10 = 2b2
b2 = 10/2
b2 = 5
Learn more about Solve for b2 here:
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