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Read the summary of “The Beginnings of the Maasai.” In “The Beginnings of the Maasai,” the daughter of the Maasai explains the relationship between the Maasai and their sky god Enkai. She explains how a volcanic eruption sent Enkai and the cattle into the sky. In order to save the cattle, Enkai created a giant tree that allowed them to walk back to earth. Then, Enkai entrusted Neiterkob, the narrator’s father, and his tribe to care for the cattle. As a result, the cattle are sacred to the Maasai, and the Maasai maintain a close connection with Enkai. Is this an effective summary of the story? Yes, because it includes key ideas from the beginning, middle, and end, and it explains the conflict and the resolution. Yes, because it focuses on the details from the beginning, the obstacles from the middle, and the resolution from the end. No, because it is uses too many specific names from the beginning, middle, and end, and it has a vague resolution. No, because it leaves out details from the beginning, the obstacles from the middle, and the resolution from the end.

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Read the summary of “The Beginnings of the Maasai.” In “The Beginnings of the Maasai,” the daughter of the Maasai explains the relationship between the Maasai and their sky god Enkai. She explains how a volcanic eruption sent Enkai and the cattle into the sky. In order to save the cattle, Enkai created a giant tree that allowed them to walk back to earth. Then, Enkai entrusted Neiterkob, the narrator’s father, and his tribe to care for the cattle. As a result, the cattle are sacred to the Maasai, and the Maasai maintain a close connection with Enkai. Is this an effective summary of the story? Yes, because it includes key ideas from the beginning, middle, and end, and it explains the conflict and the resolution. Yes, because it focuses on the details from the beginning, the obstacles from the middle, and the resolution from the end. No, because it is uses too many specific names from the beginning, middle, and end, and it has a vague resolution. No, because it leaves out details from the beginning, the obstacles from the middle, and the resolution from the end.

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The most common way of restraining dairy cows is with? A. a cattle chute. B. nose tongs. C. a halter. D. a tail Jack.

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The most common way of restraining dairy cows is with? A. a cattle chute. B. nose tongs. C. a halter. D. a tail Jack.

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Read the summary of “The Beginnings of the Maasai.” In “The Beginnings of the Maasai,” the daughter of the Maasai explains the relationship between the Maasai and their sky god Enkai. She explains how a volcanic eruption sent Enkai and the cattle into the sky. In order to save the cattle, Enkai created a giant tree that allowed them to walk back to earth. Then, Enkai entrusted Neiterkob, the narrator’s father, and his tribe to care for the cattle. As a result, the cattle are sacred to the Maasai, and the Maasai maintain a close connection with Enkai. Is this an effective summary of the story? Yes, because it includes key ideas from the beginning, middle, and end, and it explains the conflict and the resolution. Yes, because it focuses on the details from the beginning, the obstacles from the middle, and the resolution from the end. No, because it is uses too many specific names from the beginning, middle, and end, and it has a vague resolution. No, because it leaves out details from the beginning, the obstacles from the middle, and the resolution from the end.

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Answer:

Henri Rousseau’s Portrait of a Woman

Explanation:

Magical Realism finds precedent in eighteenth-century Gothic novels, but also connects with sixteenth-century Baroque or Surrealism, almost contemporary in the early twentieth century.

Among the most striking features of this movement, we find the blend of realism with pure unreality that is observed as normal, with the integration of magical elements without seeming extraordinary.

These works do not explain the supernatural elements and are narrated as something natural, with characters unaware of their transcendent dimension. In addition, death has paramount value in the relativistic discourse of truth, with a metaphysical focus on space and time and an intimate atmosphere that blends characters with myths, legends, and natural cultures.

Henri Rousseau’s Portrait of a Woman is considered one of the first magical realistic stories.

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The government established a commission that told Native Americans to live like white settlers by a. farming and attending schools c. farming and traveling abroad b. farming and raising cattle d. all of the above

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The government established a commission that told Native Americans to live like white settlers by a. farming and attending schools c. farming and traveling abroad b. farming and raising cattle d. all of the above

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The figure below shows the ideal pattern of movement of a herd of cattle, with the arrows showing the movement of the handler as he moves the herd. The arc the handler makes from the starting point to the return point should be a quarter of a circle.. . . . Based on this theory, what distance will the handler move from the starting point to the return point if he creates an arc of a circle of radius 80 feet?. A) 125.6ft B) 502.4ft C) 83.73ft D) 62.8ft

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You need to determine the number of ways in which 30 competitors from 50 can qualify. First, you have to realize that the order is irrelevant, that is: it is the same competitor_1, competitor _2, competitor _3 than competitor_3, competitor_2, competitor_1, or any combination of those three competitors.

So, the number of ways is which 30 competitors from 50 can qualify is given by the formula of combinations, which is:

C (m,n) = m! / (n! * (m -n)! )

=> C (50,30) = 50! / (30! (50 – 30)! ) = (50!) / [30! (50 – 30)!] = 50! / [30! 20!] =

 = 47,129,212,243,960 different ways the qualifiying round of 30 competitors can be selected from the 50 competitors.

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The largest cattle rancher in a given region will be unable to have a __________ when sufficient numbers of smaller cattle ranchers provide sources of competition

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The following equation of parabola is given:

p(x)= – 5 x^2 + 240 x – 2475

where p(x) = y

This is a standard form of the parabola. We need to
convert this into vertex form of equation. The equation must be in the form:

y – k = a (x – h)^2

Where h and k are the vertex of the parabola. Therefore,

y = – 5 x^2 + 240 x – 2475

y = -5 (x^2 – 48 x + 495)

Completing the square:

y = -5 (x^2 – 48 x + 495 + _) – (-5)* _

Where the value in the blank _ is = -b/2

Since b = -48        therefore,

y = -5 (x^2 – 48 x + 495 + 81) + 405

y – 405 = -5 (x^2 – 48 x + 576)

y – 405 = -5 (x – 24)^2

Therefore the vertex is at points (24, 405).

The company should make 24 tables per day to attain maximum
profit.

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Approximately how much of central Americas agricultural land is used for cattle

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Approximately how much of central Americas agricultural land is used for cattle

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A rancher needs to enclose two adjacent rectangular? corrals, one for cattle and one for sheep. if the river forms one side of the corrals and 420420 yd of fencing is? available, find the largest total area that can be enclosed.

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Solution:

The Given Rectangle having dimensions

Length = 80 cm

Breadth = 50 cm

Let the Six squares which has been cut from this rectangle have side of length a cm.

Area of each square = (Side)²= a²

Area of 6 Identical Squares = 6 × a²= 6 a²

If four squares are cut from four corners and two along Length,

then , Length of Box = (80 – 3 a)cm, Breadth of Box = (50 – 2 a)cm, Height = a cm

Volume of Box =V = Length × Breadth × Height

    V = (80 – 3 a)× (50 – 2 a)× a

     V   = 4000 a – 310 a² + 6 a³

For Maximum Volume

V’= 0 , where V’ = Derivative of V with respect to a.

V’= 4000 – 620 a + 18 a²

V’ =0

18 a² – 620 a + 4000= 0

9 a² – 310 a + 2000=0

using determinant method

a = frac{310pmsqrt{96100-72000}}{18}=frac{310pm155}{18}=frac{310-155}{18}=8.6 cm

V”=1 8 a – 310 = -ve

which shows , when a = 8.6 cm , volume is maximum.

So, V = 4000×8.6 – 310×(8.6)²+6×(8.6)³=15288.736 cm³

OR

If four squares are cut from four corners and two along Breadth,

then , Length of Box = (80 – 2 a)cm, Breadth of Box = (50 –  3 a)cm, Height = a cm

Volume of Box =V = Length × Breadth × Height

    V = (80 – 2 a)× (50 – 3 a)× a

     V   = 4000 a – 340 a² + 6 a³

For Maximum Volume

V’= 0 , where V’ = Derivative of V with respect to a.

V’= 4000 – 680 a + 18 a²

V’ =0

18 a² – 680 a + 4000= 0

9 a² – 340 a + 2000=0

Using Determinant method

a = frac{340pmsqrt{115600-72000}}{18}=frac{340pm209}{18}=frac{131}{18}=7.6 cm

V”=18 a -340= -ve value when a = 7.6 cm, shows volume is maximum when a = 7.6 cm

V= 4000×7.6 -340 × (7.6)² +6× (7.6)³=13395.456 cubic cm

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