Nina's garden is 4 1/5 meters long and 3/10 meter wide. what is the area of nina's garden
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Area of rectangular garden = 21/53/10 = 63/50 =1
13/50
= 1.26
Consider Nina' s Garden is rectangular in shape
Length of the garden = 4 1/5 = 21/5
Width of the garden = 3/10
Area of the rectangle is given by
Area = Length Width
So the area of the garden is given by
Area= 21/53/10 = 63/50 =1
13/50
= 1.26
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Area= length * width
length = 4 1/5= 21/5 . Multiply the whole number with the denominator. 4*5= 20 . Add 20 with the numerator. 20+1=22
width= 3/10
21/5* 3/10 ( Multiply the denominators together). ( Multiply the numerators together).
21*3 / 5*10
= 63/50 meters^2 or in mixed number:1 13/50 meters^2
Answer : 63/50 meters^2 or in mixed number:1 13/50 meters^2
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SOLVE FOR VOLUME
Answers
Answer:
Step-by-step explanation:
The formula for the area of a triangle is :
To work this out you would first have to work out the area of the triangle. You can do this by multiplying the base of 14 by the height of 14, this gives you 196.
The next step is to divide the answer of 196 by 2, this gives you 98. This is because the formula is the same as that for the area of a square and that a triangle would be half of a square with the same dimensions.
The final step is to multiply 98 by the length of 20, this gives you 1960 meters cubed.
1) Multiply 14 by 14.
2) Divide 196 by 2.
3) Multiply 98 by 20.
Answer:
volume = area of triangle * height = 12.124355653*14/2 * 20 = 1697.40 m3
Step-by-step explanation:
the triangle is equilateral triangle ->
a^2 = 14^2 - 7^2 = 147
-> a = 12.124355653
volume = area of triangle * height = 12.124355653*14/2 * 20 = 1697.40 m3
Answers
Answer:
40/100
Step-by-step explanation:
I'm not sure if its correct, but if there is a total of 100 magazines and there are 40 woman magazines it must be 40/100
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Final answer:
The volume of a prism is calculated by multiplying the base area by the height, since the base and height of the triangular prism are the same as the triangular pyramid whose volume is three times smaller, the volume of the prism is 270 cubic meters.
Explanation:
The volume of a pyramid is calculated by taking one-third the base area times the height (1/3*bh). In the case of the triangular pyramid mentioned, that calculation has given us a volume of 90 cubic meters. A prism, conversely, has a volume equal to the base area times the height (bh). Given both the triangular pyramid and the prism in your question have congruent bases and the same height, the prism's volume would be three times that of the triangular pyramid. Thus, the volume of the prism is 270 cubic meters.
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Final answer:
The volume of the triangular prism, with the same congruent bases and height as a triangular pyramid of volume 90 m³, is 270 m³.
Explanation:
The volume of a prism is calculated by multiplying the area of the base by the height. In this case, the triangular pyramid and the triangular prism have congruent (same size) bases and the same heights. Therefore, if we denote the area of the base as A, and the height as h, the volume of the pyramid is calculated as (1/3)Ah, and the volume of the prism is calculated as Ah. From the problem, we know that the volume of the pyramid is 90 m³. We can use this equation to determine the volume of the prism.
Since (1/3)Ah = 90 m³ and we want to find Ah (the volume of the prism), we can multiply both sides of the equation by 3 to solve for Ah:
3 * (1/3)Ah = 3 * 90 m³
Ah = 270 m³
So, the volume of the prism would be 270 m³.
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Don’t understand how to make a function with inconsistent points.
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When you look at the scatter plot, you use the numbers in that for the numerator and denominators of your equation, then you evaluate from there and simplify your equation.
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Answers
P(A) = The Number Of Ways Event A Can Occur / The total number Of Possible Outcomes
There are 2 possible sides that is greater than 4 which is 5 & 6.
The total number of possible outcomes is 6.
P(A) = 2 / 6 = 1 / 3.