Geometry

Problem 1801

In EFG,EFHI\triangle E F G, \overline{E F} \| \overline{H I}. Given that HE=9,GH=12H E=9, G H=12, and IF=15I F=15, find GIG I.

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Problem 1802

Write the equation of the conic section shown below.

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Problem 1803

Reflect over y=1y=1 A(2,2)B(4,1)C(2,1)D(0,2)A(-2,2) B(-4,-1) C(2,-1) D(0,2) AA^{\prime} ( \square \square ) B(B^{\prime}( \square \square , C(C^{\prime}( \square . \square D(D^{\prime}( \square . \square

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Problem 1804

7 of 15
5E: Changing the Area hink back to the original description of the ectangular sandbox. e were told that Alexa has a rectangular sandbox lat measures 8 ft long and 6 ft wide. She wants to crease the area to 120ft2120 \mathrm{ft}^{2} by increasing the width d length by the same amount.
Based on the description and your calculations, fill in the table below. Just enter the numbers in the boxes. ÷\div 勘 Present Gallery React (ㄷ) ings

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Problem 1805

21. You have a 1200 -foot roll of fencing and a large field. You want to make two paddocks by splitting a rectangular enclosure in half. What is the maximum area and the dimensions of this largest rectangular enclosure? \begin{tabular}{|l|l|} \hline\square \\ \square \end{tabular}

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Problem 1806

A parallelogram has sides of lengths 8 and 7 , and one angle is 3838^{\circ}. What is the length of the smaller diagonal? length == \square units
What is the length of the longer diagonal? length = \square units
Enter your answer as a number; your answer should be accurate to 3 decimal plo

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Problem 1807

6 Gjej gjatësinë e brinjës së shënuar me x në formën aba \sqrt{b}, ku aa dhe bb janë numra natyrorë.

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Problem 1808

If each square in the grid represents a square foot, then which statements are true? Choose allthatare correct A. Each bookshelf has a perimeter less than 8 feet. B. The perimeter of the s of a is more than 12 feet. C. The perimeter of the entertainment center is less than 14 feet. D. The perimeter of the chair is a bout 8.5 feet. E. The perimeter of the area rug is about 20 feet.

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Problem 1809

Suppose that v=22\|\vec{v}\|=22 and w=6\|\vec{w}\|=6. Suppose also that, when drawn starting at the same point, v\vec{v} and w\vec{w} make an angle of 5π6\frac{5 \pi}{6} radians. (A.) Find w+v\|\vec{w}+\vec{v}\| and round to two decimal places. w+v=\|\vec{w}+\vec{v}\|=\square (B.) Find wv\|\vec{w}-\vec{v}\| and round to two decimal places. wv=\|\vec{w}-\vec{v}\|=

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Problem 1810

Find the measure of 6\measuredangle 6. 6=[?]\triangle 6=[?]^{\circ}

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Problem 1811

1. The point where the graph of a function crosses the xx-axis is called the \qquad
2. To find the xx-intercept, set \qquad to zero and solve for x .
3. The point where the graph of a function crosses the yy-axis is called the \qquad .
4. To find the yy-intercept, set \qquad to zero and solve for yy.

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Problem 1812

13. What is the slope of the line y=4y=4 ?
14. What is the slope of the line x=2x=-2 ? undefined
15. What is the slope of the line x=0x=0 ?
16. Which axis is y=1y=-1 parallel to?
17. Which axis is x=4x=4 parallel to?
18. How does the graph of y=3y=3 differ from y=3xy=3 x ? explain.

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Problem 1813

Click on the graph to view a larger graph Use the Law of Cosines to find the indicated angle xx given in the graph x=x= \square degrees;

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Problem 1814

There are two triangles for which A=30,a=7, and b=10A=30^{\circ}, \quad a=7, \quad \text { and } \quad b=10
The larger one has c=c= \square and the smaller one has c=c= \square

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Problem 1815

The path of a satellite orbiting the earth causes it to pass directly over two tracking stations AA and BB, which are 47 miles apart. When the satellite is on one side of the two stations, the angles of elevation at AA and BB are measured to be 87 degrees and 84 degrees, respectively, see the graph
Click on the graph to view a larger graph (a) How far is the satellite from station A? Your answer is \square miles; (b) How high is the satellite above the ground? Your answer is \square miles;

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Problem 1816

No, not similar Yes, SAS Theorem Yes, SSS - Theorem Yes, AA 〜 Postulate

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Problem 1817

4. Use similar triangles to determine the unknown value in each figure. a)

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Problem 1818

Дан равнобедренный треугольник АВС. Основание AC=6A C=6. Высота BH=5\mathrm{BH}=5. На высоте ВН взята точка О так, что ВО = 1. Прямая АО пересекает сторону ВС в точке KK. Найдите AK.

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Problem 1819

Which ordered pair is shown on the graph? ([?], ) \square Enter

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Problem 1820

A rectangular bin has the following dimensions. Write a formula that represents the volume, V , of the bin. V=V= \square (Simplify your answer. Do not factor.)

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Problem 1821

A surveyor must measure the distance between the two banks of a straight river. (See the figure below.) She sights a tree at point TT on the opposite bank of the river and drives a stake into the ground (at point P) directly across from the tree. Then she walks 62 meters upstream and places a stake at point Q. She measures angle PQT and finds that it is 4141^{\circ}. Find the width of the river.
Enter your answer accurate to three decimal places.
The width is

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Problem 1822

If one side and two angles of a triangle are given, which law can be used to solve the triangle?
Choose the correct answer below. Law of Sines Law of Cosines Either Law of Sines or Law of Cosines The triangle cannot be solved.

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Problem 1823

If two sides and the included angle of a triangle are given, which law can be used to solve the triangle?
Choose the correct answer below. Law of Sines Law of Cosines Either Law of Sines or Law of Cosines The triangle cannot be solved.

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Problem 1824

Übung 19 Bestimmen Sie den Schnittpunkt und den Schnittwinkel der Geraden g und h . a) g:xundefined=(12)+r(31), h:xundefined=(41)+s(11)\mathrm{g}: \overrightarrow{\mathrm{x}}=\binom{1}{2}+\mathrm{r}\binom{3}{1}, \mathrm{~h}: \overrightarrow{\mathrm{x}}=\binom{4}{1}+\mathrm{s}\binom{1}{1} b) g:x=(314)+r(222),h:x=(231)+s(123)g: \vec{x}=\left(\begin{array}{l}3 \\ 1 \\ 4\end{array}\right)+r\left(\begin{array}{r}2 \\ 2 \\ -2\end{array}\right), h: \vec{x}=\left(\begin{array}{r}2 \\ 3 \\ -1\end{array}\right)+s\left(\begin{array}{r}1 \\ 2 \\ -3\end{array}\right) c) gg durch A(21)A(2 \mid 1) und B(32)B(3 \mid 2), d) gg durch A(325)A(3|2| 5) und B(563)B(5|6| 3), hh durch C(27)C(2 \mid 7) und D(45)D(4 \mid 5) hh durch C(437)C(4|3| 7) und D(264)D(-2|-6| 4)

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Problem 1825

Which can you prove congruent using AAS? A. B. C.

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Problem 1826

Which can you prove congruent using ASA? A. 5. B.
8 C.

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Problem 1827

These figures are similar. The perimeter and area of one are given. The area of the other is also given. Find its perimeter and round to the nearest tenth.
Perimeter =21.3 m=21.3 \mathrm{~m} Perimeter = [ ? ] m Area =16 m2=16 \mathrm{~m}^{2} Area =25 m2=25 \mathrm{~m}^{2}

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Problem 1828

What are the solutions, zeros, x-intercepts for the given graph? (2 Points) (3,0)(-3,0) (0,5)(0,5) (0,3)(0,-3)

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Problem 1829

10. The line has a slope of undetined and contains the point (2,8)(2,8)

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Problem 1830

The graph shows the path of a bungee jumper leaping from a bridge. How close does the jumper get to the water's surface?

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Problem 1831

A truck is filling a container with sand. The container is in the shape of a rectangular prism as pictured.
The truck puts 40 m340 \mathrm{~m}^{3} of sand in the container. How much more sand is needed to completely fill the container? A 14 m314 \mathrm{~m}^{3}
B 68 m368 \mathrm{~m}^{3} c 108 m3108 \mathrm{~m}^{3}
D 148 m3148 \mathrm{~m}^{3}
MTH1W

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Problem 1832

Apply the vocabulary from this lesson to answer each question.
1. Explain how the concepts of perimeter and circumference are related.

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Problem 1833

The radius of a circle is 3 feet. What is the circle's circumference?
Use π3.14\pi \approx 3.14 and round your answer to the nearest hundredth. \square feet

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Problem 1834

The diameter of a circle is 3 kilometers. What is the radius?
Give the exact answer in simplest form. \square kilometers

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Problem 1835

15. [AB][AC][A B] \perp[A C], [AH][BC][A H] \perp[B C], m( HAC undefined)=60m(\widehat{\text { HAC }})=60^{\circ}, AB=8|A B|=8 \Rightarrow BHHCl=\frac{|\mathrm{BH}|}{|\mathrm{HCl}|}= ? A) 12\frac{1}{2} B) 13\frac{1}{3} C) 14\frac{1}{4} D) 23\frac{2}{3} E) 34\frac{3}{4}

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Problem 1836

1. What are the xx-and yy-intercepts of the line graphed below?

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Problem 1837

4. What equation describes the line on the graph below?

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Problem 1838

8. Find the value of xx. Round to the nearest tenth Previous

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Problem 1839

Line \ell has equation y=x2y=x-2. Find the distance between \ell and the point R(5,0)R(-5,0). Round your answer to the nearest tenth.

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Problem 1840

Finding the missing length in a figure
Find the missing side length. Assume that all intersecting sides meet at right angles. Be sure to include the correct unit in your answer. \square 15 ft ?

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Problem 1841

Ritar
Given: AEB\triangle A E B is an isosceles triangle with base ABA B, and ADEBCE\angle A D E \cong \angle B C E. Prove: EBCEAD\angle E B C \cong \angle E A D. \begin{tabular}{|l|l|} \hline \multicolumn{1}{|c|}{ Statement } & \\ \hline & \multicolumn{1}{|c|}{ Reason } \\ \hline 1. AEB\triangle A E B is an isosceles triangle with base ABA B & 1. Given \\ \hline 2. ADEBCE\angle A D E \cong \angle B C E & 2. Given \\ \hline 3. & 3. \\ \hline & \\ \hline 4. DEACEB\angle D E A \cong \angle C E B & 4. \\ \hlineECBEDA\triangle E C B \cong \triangle E D A & 6. \\ \hline 6. & \\ \hline \end{tabular}
Complete the proof. AEBBEA\angle A E B \cong \angle B E A ABABA B \cong A B Definition of congruence Converse of the isosceles triangle theorem Reflexive property of congruence Vertical angles theorem CPCTC SAS Congruence AAS Congruence ASA Congruence SSS Congruence SAS Congruence

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Problem 1842

Part 2 of 2
Sheila is building an addition to a house. The points E(112,212),F(412,212),G(412,312)\mathrm{E}\left(-1 \frac{1}{2},-2 \frac{1}{2}\right), \mathrm{F}\left(4 \frac{1}{2},-2 \frac{1}{2}\right), \mathrm{G}\left(4 \frac{1}{2}, 3 \frac{1}{2}\right), and H(112,312)\mathrm{H}\left(-1 \frac{1}{2}, 3 \frac{1}{2}\right) are the points she plotted on a coordinate plane to draw the room plan. What is the shape of the addition to the house? What is the perimeter in units?

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Problem 1843

What are the xx - and yy-intercepts of the line graphed below?

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Problem 1844

A child swings on a playground swing set. If the length of the swing's chain is 3 m and the child swings through an angle of π9\frac{\pi}{9}, what is the exact arc length through which the child travels? (2 marks)

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Problem 1845

Mutual Funds Suppose that in a certain year, the Fidelity Nordic Fund (FNORX) was expected to yield 5\%, and the T. Rowe Price Global Technology Fund (PRGTX) was expected to yield 8%8 \%. You would like to invest a total of up to $80,000\$ 80,000 and earn at least $5,500\$ 5,500 in interest. Draw the feasible region that shows how much money you can invest in each fund (based on the given yields). (Place FNORX on the xx-axis and PRGTX on the yy-axis. Select Update Graph to see your response plotted on the screen. Select the Submit button to grade your response.) \begin{tabular}{|c|c|c|} \hline Inequality & Two Points (x,y)(x, y) on the Graphed Line & Point ( x,yx, y ) in Shaded Region \\ \hline availabie dollars & (,0)(0,)\begin{array}{l} (\square, 0) \\ (0, \square) \end{array} & ()(\square) \\ \hline desired interest & (,0)(0,)\begin{array}{l} (\square, 0) \\ (0, \square) \end{array} & ()(\square) \\ \hline x0x \geq 0 & (,0)(,1)\begin{array}{l} (\square, 0) \\ (\square, 1) \end{array} & ()(\square) \\ \hline y0y \geq 0 & (0,)(1,)\begin{array}{l} (0, \square) \\ (1, \square) \end{array} & ()(\square) \\ \hline \end{tabular}

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Problem 1846

A blueprint is drawn using a scale of 2inm25ft\frac{2 \mathrm{inm}}{25 \mathrm{ft}}. What length is represented by 1 mm ?
50 ft 12.5 ft 10.5 ft
23 ft

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Problem 1847

A blueprint is drawn using a scale of 2inm25ft\frac{2 \mathrm{inm}}{25 \mathrm{ft}}. What length is represented by 1 mm ?
50 ft 12.5 ft 10.5 ft
23 ft

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Problem 1848

10) through: (3,4)(-3,4) and (0,0)(0,0)

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Problem 1849

Heather has 360 meters of fencing and wishes to enclose a rectangular field. Suppose that a side length (in meters) of the field is xx, as shown below. (a) Find a function that gives the area A(x)A(x) of the field (in square meters) in terms of xx. A(x)=A(x)= \square (b) What side length xx gives the maximum area that the field can have?
Side length xx : \square meters (c) What is the maximum area that the field can have?
Maximum area: \square square meters

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Problem 1850

A fish tank is in the shape of a cube. The volume of the tank is 64 cubic feet. What is the width, in inches, of one side of the fish tank?
192 inches 48 inches 96 inches 256 inches

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Problem 1851

15. Through (4,1)(4,1) and (1,5)(1,5)
16. With m=3m=3 and xx-intercept (5,0)(5,0)
17. Through (2,1)(-2,1) and m=2m=-2
18. Parallel to 2x+3y=52 x+3 y=-5 and passes through

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Problem 1852

ABCA B C is a right isosceles triangle, and point mis the midponit of AC\overline{A C}.
What are the coordinates of the unlabeled points? Drag and drop the correct choices into each box.
0 a a2\frac{a}{2} 2a
Point C(rr1C\left({ }^{r^{-----}} \mathrm{r}_{1}^{------}\right.

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Problem 1853

What is the perimeter? If necessary, round to the nearest tenth. \square miles

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Problem 1854

What is the perimeter? If necessary, round to the nearest tenth. \square inches

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Problem 1855

3. (3 points) SHOWING WORK, find the area and perimeter of the triangle below. Round answers to the nearest tenth and label with appropriate units.
Area == \qquad \qquad

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Problem 1856

16. ARE THE TRIANGLES SIMILAR? IF SO, STATE HOW YOU KNOW. * EGURE NOT DREWN TO SCALL. \square Yes, SAS Theorem Yes, SSS Theorem Yes, AA Postulate No, not similar

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Problem 1857

Identify the transformation from the graph of f(x)=x2f(x)=x^{2} to the graph of g(x)g(x). Then graphf(x)\operatorname{graph} f(x) and g(x)g(x) on the same coordinate plane.
17. g(x)=x27g(x)=x^{2}-7
18. g(x)=x2+10g(x)=x^{2}+10

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Problem 1858

The point W(5,2)W(5,-2) is reflected over the yy-axis. What are the coordinates of the resulting point, W'? W(W^{\prime}( \square , \square

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Problem 1859

Find the missing length in the right triangle. 10 ft 48 ft 14 ft 2 ft

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Problem 1860

From AA to BB a private plane flies 1.5 hours at 110 mph on a bearing of 2929^{\circ}. It turns at point BB and continues another 2.2 hours at the same speed, but on a bearing of 119119^{\circ} to point CC. Round each answer to three decimal places.
At the end of this time, how far is the plane from its starting point? \square miles
On what bearing is the plane from its original location? \square degrees

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Problem 1861

Table (Sine) Practice
12. IXL State Standards

Question
Select the inequality which represents the graph shown below.
Answer 30yx211x30-y \geq-x^{2}-11 x 30yx2+11x30-y \geq-x^{2}+11 x 30yx211x30-y \leq-x^{2}-11 x 30yx2+11x30-y \leq-x^{2}+11 x

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Problem 1862

Question
Select the inequality which represents the graph shown below.
Answer y3x22xy-3 \geq-x^{2}-2 x y3x2+2xy-3 \leq-x^{2}+2 x y3x2+2xy-3 \geq-x^{2}+2 x y3x22xy-3 \leq-x^{2}-2 x

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Problem 1863

Question
Select the inequality which represents the graph shown below.
Answer y+6x27xy+6 \geq-x^{2}-7 x y+6x2+7xy+6 \geq-x^{2}+7 x y+6x27xy+6 \leq-x^{2}-7 x y+6x2+7xy+6 \leq-x^{2}+7 x

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Problem 1864

Find the area of the figure. (Sides meet at right angles.) \square yd2y d^{2} Gheck O 2024 McGraw Hill LLC. Al

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Problem 1865

Find the area of this parallelogram. Be sure to include the correct unit in your answer. If necessary, refer to the list of geometry formulas. \square in

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Problem 1866

What is the floor area of the hallway shown in the figure? The outside and inside of the hallway are circular arcs.
The area of the hallway is \square m2\mathrm{m}^{2} (Round to two decimal places as needed.)

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Problem 1867

What is the floor area of the hallway shown in the figure? The outside and inside of the hallway are circular arcs.
The area of the hallway is \square m2\mathrm{m}^{2} (Round to two decimal places as needed.)

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Problem 1868

14, given the polar coordinates, name two other equivalent representations.
12. (4,2π3)\left(-4, \frac{2 \pi}{3}\right)

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Problem 1869

a point are given. Find polar c
16. (2,2)(-2,2)

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Problem 1870

Find the distance between (11,10)(11,10) and (10,8)(10,8). units

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Problem 1871

AOB\angle A O B and COB\angle C O B can best be described as -

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Problem 1872

Find the distance between (3,4)(3,4) and (0,0)(0,0). \square units
Type the correct answer, then press Ent is not an even number, round it to the

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Problem 1873

-18, the rectangular coordinates of a point are given. Find polar coordinates for each point.  (16) (2,2)r=x2+y2θ=tan1(y/r=(2)2+(2)24+4=8θ=tan1214+4=824=8tan1(1θ=7π424=22(22, 18. (2.3,1.5)(2.3)2+(1.5)2θ=tan1\begin{array}{l} \text { (16) }(-2,2) \\ r=\sqrt{x^{2}+y^{2}} \quad \theta=\tan ^{-1}(y / \\ r=\frac{\sqrt{(-2)^{2}+(2)^{2}}}{\sqrt{4}+4=\sqrt{8}} \quad \theta=\tan ^{-1} \quad 2 \\ \begin{array}{l} 14+4=\sqrt{8} \\ \sqrt{2} \cdot 4=\sqrt{8} \end{array} \quad \tan ^{-1}(-1 \\ \begin{array}{ll} & \theta=\frac{7 \pi}{4} \\ & 2 \sqrt{4} \end{array} \\ =2 \sqrt{2} \quad(2 \sqrt{2}, \\ \begin{array}{l} \text { 18. }(2.3,-1.5) \\ \sqrt{(2.3)^{2}+(-1.5)^{2}} \quad \theta=\tan ^{-1} \end{array} \end{array}

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Problem 1874

2xy=52 x-y=-5 graph

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Problem 1875

Questions 14 and 15 refer to the following.
Four forces of equal magnitude are exerted on a square at the locations and in the directions indicated in the figure. Points A and B are labeled for reference. 15 Mark for Review
Which of the forces, if any, exerts zero torque about Point B? (A) F1F_{1} (B) F3F_{3} (C) Both F1F_{1} and F3F_{3} (D) None of the forces exert zero torque about Point B

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Problem 1876

The ratio of the side length of a square to the square's perimeter is always 1 to 4 . Peter drew a square with a perimeter of 28 inches.
What is the side length of the square Peter drew?

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Problem 1877

Francesca's mural is 12ft12 \mathrm{ft} high and 135ft135 \mathrm{ft} long. What are the dimensions of her scale drawing using 3 cm3 \mathrm{~cm} for every 4ft4 \mathrm{ft}?

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Problem 1878

A 12.875m12.875-\mathrm{m} fence is one side of a rectangle. With 45.625 m45.625 \mathrm{~m} left for the other sides, find the longer dimension.

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Problem 1879

Find the area of parallelogram ABCDABCD with sides 6 and 4 units and an angle of 125 degrees. Compare it to 24.

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Problem 1880

Find the perimeter of triangle ABC where AF=6AF=6, CD=5CD=5, and BE=4BE=4.

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Problem 1881

Francesca's mural is 12ft12 \mathrm{ft} high and 135ft135 \mathrm{ft} long. With a scale of 3cm3 \mathrm{cm} for 4ft4 \mathrm{ft}, find the drawing's dimensions.

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Problem 1882

A scale drawing shows a closet measuring 4.4 cm4.4 \mathrm{~cm} by 3.2 cm3.2 \mathrm{~cm}. With a scale of 2 cm2 \mathrm{~cm} to 1 m1 \mathrm{~m}, find the actual area.

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Problem 1883

A rectangle has dimensions 10 cm10 \mathrm{~cm} by 8 cm8 \mathrm{~cm}. If length increases by 60%60\%, find width's percentage change if: (a) perimeter stays the same. (b) area stays the same.

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Problem 1884

Four points A, B, C, D on a semicircle satisfy ABundefined=BCundefined=CDundefined|\overrightarrow{\mathrm{AB}}|=|\overrightarrow{\mathrm{BC}}|=|\overrightarrow{\mathrm{CD}}|. Assess the validity of assertions A and R.

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Problem 1885

Calcula cuántos rollos de material necesita comprar para insonorizar 4 paredes de 2 m x 2.2 m, considerando una puerta de 0.8 m.

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Problem 1886

Calcula la magnitud de un vector con x=3x=3 y y=2y=2. Opciones: a. 5 b. 3.6 c. 6 d. 1

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Problem 1887

Calcula el volumen de un archivador de 150 cm150 \mathrm{~cm} alto, 55 cm55 \mathrm{~cm} ancho y 60 cm60 \mathrm{~cm} fondo en m³.

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Problem 1888

Desenați: a) dreapta dd, punctul AA exterior, și punctele CC, DD pe dd; b) dreapta dd, punctul MM pe dd și colorați 2 semidrepte; c) 3 semidrepte cu originea OO; d) un plan cu 2 semiplane, colorând unul.

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Problem 1889

Find the radius of a sphere with volume 4.5 m34.5 \mathrm{~m}^{3} using the formula V=43πr3V=\frac{4}{3} \pi r^{3}.

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Problem 1890

Find the maximum value of bb for the point (a,b)(a,b) satisfying the inequalities: y15x+3000y \leq -15x + 3000 and y5xy \leq 5x.

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Problem 1891

Find the maximum value of bb for the point (a,b)(a, b) that satisfies the inequalities y15x+3000y \leq -15x + 3000 and y5xy \leq 5x.

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Problem 1892

Find the length LL and width WW (with WLW \leq L) of a rectangle with perimeter 28 that maximizes area. What is the max area?

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Problem 1893

Find the Earth's orbital speed given a radius of 1.49 x 10810^8 km and a period of 5.25 days.

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Problem 1894

Un voilier a un mât de 3,6 m3,6 \mathrm{~m} avec un étai de 4,2 m4,2 \mathrm{~m} et des haubans de 3,9 m3,9 \mathrm{~m}. Est-ce que les triangles VEN et VNT sont rectangles ? Justifie.

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Problem 1895

À quelle distance du pied d'un arbre de 13,5 m, coupé à 6 m, se trouve la cime après sa chute ?

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Problem 1896

Vẽ tia Ax\mathrm{Ax}, chọn BAx\mathrm{B} \in \mathrm{Ax} với AB=8 cm\mathrm{AB}=8 \mathrm{~cm}, và C\mathrm{C} sao cho AC=4 cm\mathrm{AC}=4 \mathrm{~cm}.
a) C có nằm giữa A và B không? Tại sao? b) So sánh CA\mathrm{CA}CB\mathrm{CB}. c) C có phải là trung điểm của AB\mathrm{AB} không? Tại sao?

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Problem 1897

Find the length of the third side of a triangle with sides 30.3 m, 18.5 m, and an angle of 6161^{\circ} between them.

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Problem 1898

Find the third side of a triangle with sides 30.3 m and 18.5 m, and an angle of 6161^{\circ}. Options: 24.1 m, 26.8 m, 30.0 m, 32.6 m.

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Problem 1899

Find the length of the third side of a triangle with sides 600 m600 \mathrm{~m}, 250 m250 \mathrm{~m}, and opposite angle 3434^{\circ}.

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Problem 1900

Find the length of the third side of a triangle with sides 45.3 m45.3 \mathrm{~m}, 29.0 m29.0 \mathrm{~m}, and angle 2626^{\circ}.

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