Diagram & Picture

Problem 1401

Que regla o principio no se cumple en el siguiente diagrama de orbitales 1 s 2 s (个ฟ) (१ฟへ)
Select one: Principio de Heisenberg Principio de Pauli Regla de Hund Principio de Aufbau Relacion de de Broglie

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Problem 1402

A triangular block has faces at 4545^{\circ} and 3030^{\circ}. Find speed of AA after both particles travel 0.4 m0.4 \mathrm{~m}.

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Problem 1403

Compare the value of the 6 in the thousands place (60006000) to the 6 in the hundreds place (600600).

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Problem 1404

Find the values of aa, bb, cc, and dd in the magic square where rows, columns, and diagonals sum to the same number.

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Problem 1405

Complete the unmagic square with different sums for rows, columns, and diagonals using digits 1-9:
8 & & 9 & 7 & 1 & & 6
Choose from options A, B, C, or D.

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Problem 1406

Find the height corresponding to side SPS P of parallelogram PQRSP Q R S if reducing sides SPS P and RQR Q by 10 cm10 \mathrm{~cm} decreases area by 120 cm2120 \mathrm{~cm}^{2}.

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Problem 1407

Find the value of zz given x=zx = z, x=6k+13x = 6k + 13, and y=8k29y = 8k - 29 with lines mm and nn parallel.

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Problem 1408

Create subitizing cards for these expressions and find the solutions:
1. 3+7-3+7
2. 4+4-4+4
3. 5+(7)5+(-7)

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Problem 1409

Draw the angle 150150^{\circ}, find its reference angle, and identify the quadrant of its terminal side.

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Problem 1410

Draw the angle 240-240^{\circ} in standard position and identify its quadrant.

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Problem 1411

Subtract 9128589 \frac{1}{2} - 8 \frac{5}{8} and simplify the answer to a whole number, proper fraction, or mixed number.

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Problem 1412

Complete the equation using the place value chart: 10 ÷ 10 = $$.

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Problem 1413

Divide 192 by a 2-digit number 16 and illustrate with a simple drawing. Find the result of 19216\frac{192}{16}.

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Problem 1414

10. Identify pairs of vertically opposite, adjacent, linear pair, complementary, and supplementary angles. Given 4=110\angle 4=110^{\circ} and 5=120\angle 5=120^{\circ}, find the others.
11. What is the angle that equals its complement?
12. What is the angle that equals its supplement?

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Problem 1415

Draw 2 line segments of different lengths with MM as their midpoint.

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Problem 1416

Given ADBCA D \parallel B C, with AD=35 cmA D=35 \mathrm{~cm}, BD=37 cmB D=37 \mathrm{~cm}, and BC=45 cmB C=45 \mathrm{~cm}, find ABA B and the area of trapezium ABCDA B C D.

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Problem 1417

Given AB=36 cm,BC=48 cm,AD=109 cmAB=36 \mathrm{~cm}, BC=48 \mathrm{~cm}, AD=109 \mathrm{~cm}, find ACAC, CDCD, and the area of quadrilateral ABCDABCD.

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Problem 1418

In line BDCB D C, given AB=40A B=40, BC=32B C=32, AC=24A C=24, and CD=7C D=7, determine if C\angle C is right and find ADA D.

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Problem 1419

Find the area of triangle ABCABC given AE=10 cm,BC=20 cm,CD=17 cm,DE=2 cm,EF=6 cmAE=10 \mathrm{~cm}, BC=20 \mathrm{~cm}, CD=17 \mathrm{~cm}, DE=2 \mathrm{~cm}, EF=6 \mathrm{~cm}, correct to 3 significant figures.

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Problem 1420

Which diagram shows "If it is a triangle, then it has three vertices"? A. 3 vertices outside B. 3 vertices inside

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Problem 1421

8
2. Write the ratio that correctly describes the number of white stars compared to the number gray stars. Write your answer in the box below.

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Problem 1422

A ramp forms the angles shown to the right. What are the values of a and b ?
The value of aa is

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Problem 1423

Question Watch Video Show
The measures of the angles of a triangle are shown in the figure below. Solve for x .

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Problem 1424

In the diagram, lines \ell and mm are cut by transversals nn and ρ\rho.
Part A Enter the measure of 1\angle 1. \square
Part B Enter the measure of 2\angle 2. \square

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Problem 1425

Consider the indefinite integral x5x665dx\int x^{5} \cdot \sqrt[5]{x^{6}-6} d x : This can be transformed into a basic integral by letting u=u= \square and du=dxd u=\square d x
Performing the substitution yields the integral \square dud u

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Problem 1426

Use rigid motions to prove that figure ABCA B C is congruent to figure EFGE F G.
Type your response in the space below. B I U Σ\Sigma : 2{ }_{2}{ }^{\equiv}
Type here

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Problem 1427

The measure of angle QQ is 70 degrees. Find the measure of angle PP.
Type the answer in the box below.
Angle PP has a measure of \qquad

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Problem 1428

Here is parallelogram ABCDA B C D :
Prove segment AMA M is congruent to segment CMC M. Type your response in the space below.
B II
U Type here

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Problem 1429

[4 marks] b) The set of quantum numbers for 3 electrons with the highest principal quantum numbers in atom X are shown below: (n=4,1=0,m=0,s=+1/2)(n=4,1=0,m=0,s=1/2)(n=4,1=1,m=0,s=+1/2)\begin{array}{l} (n=4,1=0, m=0, s=+1 / 2) \\ (n=4,1=0, m=0, s=-1 / 2) \\ (n=4,1=1, m=0, s=+1 / 2) \end{array} i. Write the electronic configuration of stable ion X . ii. Sketch the shapes of orbital occupied by the electrons with the highest principal quantum number in atom X . [3 marks]

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Problem 1430

To find the height hh of Mount St. Melon in the Cantaloupe Mountains, two angle measurements were taken 1200 feet apart along a direct line toward the mountain. Using these measurements, find the height of the mountain. Homework Help

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Problem 1431

PROBEM Use your notes/slide from class to answer The FOLOWING questions abOUT THE POIYgon SHOWN AT THE RICHT.
AJ HOW WOULD YOU NAME II, BASED ON THE NUMBER OF SIDES?
BJ ISIT GONGAVE OR CONVEX?
CI IS II EQULAMEULAR? WHY OR WHY NOT?
DJ IS IT REGULAR? WHY OR WHY NOT?

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Problem 1432

Calculator
What is the area of rhombus ABCDA B C D ?
Enter your answer in the box. Do not round at any steps. \square units 2^{2}

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Problem 1433

Which estimate best describes the area of this figure? 10in210 \mathrm{in}^{2} 15in215 \mathrm{in}^{2} 20in220 \mathrm{in}^{2} 35 in 2^{2}

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Problem 1434

What is the area of rhombus ABCDA B C D ?
Enter your answer in the box. Do not round at any steps. \square units 2{ }^{2}

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Problem 1435

10. Expand and simplify.

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Problem 1436

100 pizz B. 10m C 100 45° A abaily

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Problem 1437

The unit circle is shown below. Complete the following. (a) Sketch θ=30\theta=-30^{\circ} in standard position on the unit circle.
Find the lengths of the legs of its reference triangle. These are labeled aa and bb in the figure below, when an angle is sketched. Then use your reference triangle to find the coordinates of point PP. Use exact values and not decimal approximations. a=b=P=(,)\begin{array}{l} a=\square \\ b=\square \\ P=(\square, \square) \end{array}

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Problem 1438

Skipped Bookmarked
7 Which of the following correctly solves the equation 8+4/58+4 / 5 ? 10 40/4 45/8 45/5 Skip 6/10 complete

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Problem 1439

OAB is a sector of a circle as shown below.
Work out the length of the arc AB . Give your answer to 1 d.p.

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Problem 1440

MASTER 2.5 Surface area of cin
1 The diagram shows the net of a cube. cuboids The surface area of a 3 D shape is the total area of all its faces. You can draw a net to help you is the total area of all
Work out a the area of one face of the cube 10×10=10 \times 10= \qquad 10 cm210 \mathrm{~cm}^{2} b the surface area of the cube 6×6 \times \qquad == \qquad cm2\mathrm{cm}^{2}
2 The diagram shows a cube of side length 5 cm . Find the surface area of the cube.
3 Calculate the surface area of each cuboid. a Surface area 200100200 \quad 100 =2(20×10)+2(20×5)+=2(20 \times 10)+2(20 \times 5)+ 10020×10=100 \quad 20 \times 10= =2(20×10)+2(20×5)+2(10×5)=2(20 \times 10)+2(20 \times 5)+2(10 \times 5) =2(20×10)+2(20×5)+2(10×5)=2×200+2×100+2×200=200+100+20050 m2\begin{array}{l} =2(20 \times 10)+2(20 \times 5)+2(10 \times 5) \\ =2 \times 200+2 \times 100+2 \times 200 \\ =200+100+200 \ldots 50 \mathrm{~m}^{2} \end{array}
There are two of each size face: top and bottom, front and back, left and right sides. b
4 STEM The building One Canada Square in Canary Wharf, London, is roughly cuboidal in shape. It is approximately 235 m high, 55 m long and 50 m wide. All four walls are covered in glass, but not the roof. a Work out the surface area of the glass.
A skyscraper uses approximately 125 kg of steel to support one square metre of glass. b Work out the mass of steel used to support the glass in One Canada Square. Show how to check your answer using estimation.
5 Problem-solving A cuboid has a height of 7 cm and a width of 9 cm . Its volume is 661.5 cm3661.5 \mathrm{~cm}^{3}. Work out the surface area of the cuboid. Use the volume to work out the length of the cuboid first.

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Problem 1441

Slope of line DE=1/3D E=-1 / 3 \vee
Slope of line EF= 3 \square
Slope of line DF=1/3D F=-1 / 3 \sim \square
Length of the line DE == \square
Length of the line EF= \square
Length of the line DF= \square Determine the type of the triangle \square

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Problem 1442

chrome-extension://efaidnbmnnnibpcajpcglclefindmkaj/https.//physique.merici.ca/mechanics/chap5mech.pdf physique.me... chap5mech
In the situation shown in the diagram, the kinetic friction coefficient between the blocks and the surface is 0.4 . a) What is the acceleration of the blocks? b) What is the tension of the rope?

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Problem 1443

Find the probability, P(MR)P(M \cap R), associated with the tree diagram.
What is P(MR)\mathrm{P}(\mathrm{M} \cap \mathrm{R}) ? \square (Round to the nearest hundredth.)

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Problem 1444

Quadratic, Rational, and Radical Equations Pythagorean Theorem \square 1/3 Español ig right triangle, find the side length xx. Round your answer to the nearest hundredth

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Problem 1445

Use the tree diagram below to work out the probability that at least one of the two customers buys a vanilla ice cream. Give your answer as a fraction in its simplest form.

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Problem 1446

The probability that Zeiden scores when taking a penalty is 14\frac{1}{4}. a) Copy and complete the tree diagram below to show all the possible outcomes of Zeiden taking two penalties. b) What is the probability that he does not score the first penalty but scores the second penalty? Give your answer as a fraction in its simplest form.

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Problem 1447

A group of students sat a biology test and a chemistry test. The frequency tree below shows some information about whether the students passed or failed each test.
A student is chosen at random from the group. What is the probability that they failed at least one test? Give your answer as a fraction in its simplest form.

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Problem 1448

Debbie is on a pickleball team. Her team has 3 wins for every 2 losses so far this season.
Pick the diagram that models the ratio in the story.
If Debbie's team has won 9 games, how many games have they played altogether? \square games Submit Work it out Not feeling ready yet? These can help:

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Problem 1449

Drag the blocks to complete the proofs.
Statements 1) 2) 18\angle 1 \cong \angle 8 3) 4) 816\angle 8 \cong \angle 16 5)
Reasons 1) given 2) 3) given 4) 5) Transitive prop. \cong
Linked slide Corresponding Angles <1<16<1 \triangleq<16 a|lb clld
Alt Ext Angles

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Problem 1450

Lesson 13 Angles in Triangles Triangle Sum Theorem a b cc The sum of the three interior angles in a triangle is always 180180^{\circ}. a+b+c=180\angle a+\angle b+\angle c=180^{\circ} a
Find xx : \square Click to add text
Find the missing angles: <1= Click to add text <2= Click to add text <3= Click to add text <4= Click to add text <5= Click to add text <6= Click to add text \begin{array}{l} <1=\text { Click to add text } \\ <2=\text { Click to add text } \\ <3=\text { Click to add text } \\ <4=\text { Click to add text } \\ <5=\text { Click to add text } \\ <6=\text { Click to add text } \end{array}

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Problem 1451

Given EBCECB,AEDE\angle E B C \cong \angle E C B, \overline{A E} \cong \overline{D E} Prove ABDC\overline{A B} \cong \overline{D C}
Statements
1. EBC=ECB\angle E B C=\angle E C B
2. AE=DEA E=D E
3. EB=ECE B=E C
4. AEB=DEC\angle A E B=\angle D E C
5. ABE : DCE\triangle D C E
6. AB=DCA B=D C

Reasons
1. \square Click to add text
2. \square Click to add text Click to add text \square 3. \square 4. 5.

Click to add text \square
6. \square

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Problem 1452

7. Suppose Romeo is serenadib facing north and sees the Juliet while she is on her balcony. Romeo is other suitor, is observing balcony at an angle of elevation of 2020^{\circ}. Paris, Juliet's balcony at an angle of the situation and is facing west. Paris sees the shown. Determine of elevation of 1818^{\circ}. Romeo and Paris are 100 m apart as nearest metre.

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Problem 1453

5.
John is planning on planting vegetables and flowers in his garden. The shaded area represents where he will plant the flowers.
What is the area of space where John will plant the flowers? A. 5x2+24x+165 x^{2}+24 x+16 B. 9x2+20x+169 x^{2}+20 x+16 c. 7x2+24x+167 x^{2}+24 x+16 D. 5x2+165 x^{2}+16

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Problem 1454

The original price of a wedding cake is $67.00\$ 67.00. Which coupon is a better deal? Submit

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Problem 1455

9. Triangle ABCA B C is dilated about the origin with a scale factor of 3 to make Triangle ABCA^{\prime} B^{\prime} C^{\prime}. Determine the coordinates of AA^{\prime}. A) (3,12)(3,12) B) (1,0)(-1,0) C) (12,3)(-12,3) D) (6,9)(-6,9)

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Problem 1456

9. Triangle ABCA B C is dilated about the origin with a scale factor of 3 to make Triangle ABCA^{\prime} B^{\prime} C^{\prime}. Determine the coordinates of AA^{\prime}. A) (3,12)(3,12) B) (1,0)(-1,0) C) (12,3)(-12,3) D) (6,9)(-6,9)

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Problem 1457

A flour moth trap has the shape of a triangular prism that is open on both ends. An environmentally safe chemical draws the moth inside the prism, which is lined with an adhesive. What is the surface area of the prism-shaped trap?
The surface area of the given triangular prism is \square sq in. (Type an integer or a decimal.)

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Problem 1458

B. Construct a truth table for the symbolic statement in part AA. \begin{tabular}{|c|c|c|c|c|c|c|c|c|} \hline p & q & p\sim p & q\sim q & pq\mathrm{p} \rightarrow \sim \mathrm{q} & \multicolumn{2}{|l|}{pq\sim p \leftrightarrow q} & \multicolumn{2}{|l|}{(pq)(pq)(p \rightarrow \sim q) \wedge(\sim p \rightarrow q)} \\ \hline T & T & f & f & & & & & \\ \hline T & F & f & t & & & & & \\ \hline F & T & t & f & & & & & \\ \hline F & F & t & t & & & & & \\ \hline \end{tabular}

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Problem 1459

Solve. (Enter your answers as a comma-separated list. If there is no solution, enter NO SOLUTION.) x=x=\square
Additional Materials

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Problem 1460

Concepts of Area and Perimeter - Quiz - Level F (x)
What is the area of this tile? in. \% in2\mathrm{in}^{2} 4in4 \mathrm{in}. 7 Number Pad 4 5 6 - 2 3 2 1 in.

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Problem 1461

Concepts of Area and Perimeter - Quiz - Level F
What is the area of this tile? in. in2i n^{2} 6in6 \mathrm{in}. 2 in.

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Problem 1462

A survey of 50 students shows 25 like online classes and 35 are freshmen. Find counts for events AA, BB, ABA \cap B, and neither.

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Problem 1463

1) Express the ratio 2 to 5 in two different forms. 2) In a bar diagram with 16 sections, 6 are shaded. What fractions represent the shaded part? Choices: 38\frac{3}{8}, 616\frac{6}{16}.

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Problem 1464

Find the values for A+1A+1 and A+6A+6. If Jonathan's balance is -\$45 and he deposits \$7, what is his new balance?

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Problem 1465

Find the perimeter of a figure made of two congruent equilateral triangles, given that AD=DC=xAD = DC = x.

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Problem 1466

Find the numbers for athletes and musicians in a Venn diagram if P(AB)=715P(A|B) = \frac{7}{15}, with 25 athletes and 15 musicians admitted.

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Problem 1467

Note: Triangle may not be drawn to scale. Suppose c=9\mathrm{c}=9 and A=35\mathrm{A}=35 degrees. Find: a=a= b=b= B=B= \square degrees

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Problem 1468

Question 13 0/1 pt 3 19
Given the triangle , find the measure of angle AA using the Law of Cosines. Picture is not drawn to scale A=A= \square degrees

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Problem 1469

Solve for xx. Round to the nearest tenth, if necessary.

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Problem 1470

Using the properties of logarithms, match each of the following logarithmic statements with its expanded logarithm. Assume th all logarithms are defined. log25log27\log _{2} 5-\log _{2} 7 would be written in or dinary expression as log2(5)log2(7)\log _{-} 2(5)-\log _{-} 2(7) where 2 is the base log5(47)\log _{5}\left(\frac{4}{7}\right) Choose... log3(8a)\log _{3}(8 a) Choose... log2(9xy)\log _{2}(9 x y) Choose...

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Problem 1472

The Washington Monument is 555 ft tall. The angle of elevation from the end of the monument's shadow to the top of the monument has a cosecant of 1.10. a. θ=\theta= \square (Type your answer in degrees. Rou

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Problem 1473

Show Examples
The terminal ray of an angle θ\theta intersects the unit circle as shown below. Use the given coordinates to calculate cosθ\cos \theta rounded to three decimal places, if necessary. Answer Attempt 1 put of 2

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Problem 1474

The figure shows the electric field inside a cylinder of radius R=3.3 mmR=3.3 \mathrm{~mm}. The field strength is increasing with time as E=1.0×108t2 V/mE=1.0 \times 10^{8} t^{2} \mathrm{~V} / \mathrm{m}, where tt is in s . The electric field outside the cylinder is always zero, and the field inside the cylinder was zero for t<0t<0. (Figure 1)
Part A
Part B
Find an expression for the magnetic field strength as a function of time at a distance r<Rr<R from the center. Express your answer in teslas as a multiple of product of distance rr and time tt.

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Problem 1475

5. Listed are a few Canadian hockey players and the year they were born.
Jennifer Botterill (1979); Jonathan Cheechoo (1980); Roberto Luongo (1979); Jordin Tootoo (1983); Hayley Wickenheiser (1978)

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Problem 1476

Additionne.
26. 2x33x2+5x2 x^{3}-3 x^{2}+5 x
27. 3x27x+53 x^{2}-7 x+5
28. x2+3x5a22a7\frac{-x^{2}+3 x}{-5 a^{2}-2 a-7} x2x37t2+8t9\frac{-x^{2}-x-3}{7 t^{2}+8 t-9} 6a2+4a+36 a^{2}+4 a+3 2t210t52 t^{2}-10 t-5

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Problem 1477

Solve for xx. Round to the nearest tenth, if necessary.
Answer Attempt 1 out of 5 x=x= \square Submit Answer

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Problem 1478

If P P is the orthocenter of ABC\triangle ABC, AB=13 AB = 13 , BF=9 BF = 9 , and FC=5.6 FC = 5.6 , find the perimeter of ABC\triangle ABC.

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Problem 1479

In the distributions shown, state the mean and standard deviation for each. Hint: The vertical lines are 1 standard deviation apart.
Part: 0 / 2
Part 1 of 2 (a)
Mean = \square Standard deviation == \square

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Problem 1480

a) Solve the trigonometric equation: 5sinϕ+3=05 \sin \phi+3=0 for values of ϕ\phi from 00^{\circ} to 360360^{\circ}. [9 marks] b) Use the diagram provided below to answer the following questions. i. Calculate the length of PR|P R|, correct to the nearest whole number. [4 marks] ii. show that PSR=90\angle \mathrm{PSR}=90^{\circ} [5 marks] c) Determine whether or not the ordered triple (8,6,9)(8,6,9) is a Pythagorean triple? [2 marks]

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Problem 1481

Here is a little more review concerning trig functions. Using the formula for sin()\sin () and cos()\cos () of the sum of two angles. 3cos(5x2)=3cos(2)cos(5x)3sin(2x2)=3sin(2)cos(2x)+3cos(2)\begin{array}{ll} 3 \cos (5 x-2)=3 \cos (2) & \cos (5 x)- \\ 3 \sin (2 x-2)=-3 \sin (2) & \cos (2 x)+3 \cos (2) \end{array}
Now reverse this formula and given the expanded version find the version with just one term. This involves solving a pair of equations -in order to get Acos(x)+Bsin(x)=Rsin(x+b)=Rsin(b)cos(x)+Rcos(b)sin(x)A \cos (x)+B \sin (x)=R \sin (x+b)=R \sin (b) \cos (x)+R \cos (b) \sin (x) what values must you choose for RR and bb ? (Match coefficients.)
By convention we'll assume that the amplitude (the first coefficient on the left hand side) is positive. cos(5x+)=4cos(5x)+2sin(5x)sin(2x+arctan(3) - )=6cos(2x)+2sin(2x)\begin{array}{l} \cos (5 x+\square)=4 \cos (5 x)+-2 \sin (5 x) \\ \sin (2 x+\arctan (3) \quad \text { - })=6 \cos (2 x)+2 \sin (2 x) \end{array}
The upshot of this exercise is that we can always rewrite the sum of multiples of sin()\sin () and cos()\cos () as a singlesin()\operatorname{single} \sin () function with a given amplitude and phase shift. We could also write it as a single cos()\cos (), but it would have a different phase in that case. We'll use this many times in interpreting results.

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Problem 1482

In this sequence, what fraction is hidden behind the paint? 4/8,1,14 / 8,1,1 1/2, 2, \qquad

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Problem 1483

```latex \begin{problem} Consider a rectangle ABCDABCD with AB=20cmAB = 20 \, \text{cm} and BC=15cmBC = 15 \, \text{cm}. A circle with center OO and radius 4cm4 \, \text{cm} is inscribed such that SS, XX, and TT are points on the circle. The line segments DSADSA and DTCDTC are tangents to the circle. The line segment TXTX is a diameter of the circle. The shape DSXTDSXT is removed from the corner of the rectangle, leaving a shaded shape as shown in the second diagram.
Calculate the area of the shaded shape. \end{problem}

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Problem 1484

(b) Rajah di bawah menunjukkan sebuah bulatan dengan pusat OO dan jejari j cmj \mathrm{~cm}. LL adalah luas sektor minor bagi bulatan tersebut. The diagram below shows a circle with centre OO and radius of j cm,Lj \mathrm{~cm}, L is the area of minor sector of the circle.
Berdasarkan rajah tersebut, lengkapkan jadual di ruang jawapan dengan menggunakan pilihan jawapan di bawah. Based on the diagram, complete the table in the ansiver space using the options below. (Guna / use π=227\pi=\frac{22}{7} ) \begin{tabular}{|l|l|l|l|} \hline 12 & 14 & 130 & 150 \\ \hline \end{tabular}
Jawapan / Answer. \begin{tabular}{|c|c|c|} \hlineθ\theta^{\circ} & j cmj \mathrm{~cm} & L cm2L \mathrm{~cm}^{2} \\ \hline 120 & & 150.85 \\ \hline & 7 & 64.17 \\ \hline \end{tabular}

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Problem 1485

The sequence below is the start of the triangular number sequence. Work out the next two number terms in the sequence.

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Problem 1486

Using Pythagoras' theorem, calculate the length of PR. Give your answer in centimetres (cm) and give any decimal answers to 1 d .p.
Not drawn accurately

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Problem 1487

24. Find two numbers that each have exactly 16 factors, OPEN two of which are 8 and 12.

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Problem 1488

Plot 78\frac{7}{8}
Plot 88\frac{8}{8}
Use the number lines above to compare 78\frac{7}{8} and 88\frac{8}{8}. 7888\begin{array}{ll}\frac{7}{8} & \frac{8}{8}\end{array}

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Problem 1489

Plot 22\frac{2}{2}.
Plot 23\frac{2}{3}.
Use the number lines above to compare 22\frac{2}{2} and 23\frac{2}{3}. 2223\frac{2}{2} \quad \frac{2}{3}

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Problem 1490

Plot 34\frac{3}{4}.
Plot 38\frac{3}{8}.
Use the number lines above to compare 34\frac{3}{4} and 38\frac{3}{8}. 34<38\frac{3}{4}<\frac{3}{8}

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Problem 1491

Plot 34\frac{3}{4}.
Plot 38\frac{3}{8}.
Use the number lines above to compare 34\frac{3}{4} and 38\frac{3}{8}. 34<38\frac{3}{4}<\frac{3}{8}

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Problem 1492

Listen
Decide whether enough information is given to prove that ABCQRS\triangle A B C \cong \triangle Q R S. If so, state the theorem you would use. There is not enough information. There is enough information to use the AAS Congruence Theorem. There is enough information to use the ASA Congruence Theorem.

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Problem 1493

I'm sorry, I can't assist with that.

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Problem 1494

Two parallelograms fit inside a rectangle as shown. Work out the area of the shaded part of this shape.

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Problem 1495

(1 point)
Let WW be the set of all vectors of the form [2s+3t5s+2t4st]\left[\begin{array}{c}2 s+3 t \\ 5 s+2 t \\ 4 s-t\end{array}\right]. Find vectors w~\tilde{w} and zz in R3\mathbb{R}^{3} such that W=span{z~undefined,}\mathbb{W}=\operatorname{span}\{\overrightarrow{\tilde{z}}, \vec{\nabla}\}. u=[]v=[]\vec{u}=\left[\begin{array}{l} \square \\ \square \\ \square \end{array}\right] \cdot \vec{v}=\left[\begin{array}{c} \square \\ \square \\ \square \end{array}\right]

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Problem 1496

Jack is planting trees along a path in the park. He wants the trees to be located equidistant from the pat
If trees GG and MM are a pair, tree MM should be planted at ( Select Choice \square Select Choice \square ).

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Problem 1497

ABCDEF;mA=\triangle A B C-\triangle D E F ; m \angle A= \qquad ; m<E=\mathrm{m}<\mathrm{E}= \qquad x=x= \qquad ; y= The perimeter of ABC is 36.\begin{array}{l} y= \\ \text { The perimeter of } \triangle A B C \text { is } 36 . \end{array}

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Problem 1498

8-2: MathXL for School: Practice and Problem-soiving ( Part 3 of 4
How can you derive the Law of Cosines for obtuse angle Q? x2+h2=p2x^{2}+h^{2}=p^{2}
Use the Pythagorean Theorem to write an equation for q2q^{2} in terms of r,xr, x, and hh. q2=\mathrm{q}^{2}=\square Video Textbook Get more help - Question 14 of 26 Back Next

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Problem 1499

Vame: Core:
Study Guide for Test 3: Stretching and Shrinking From Investigation 1 , you should be able to... Define scale factor -
Find the scale factor between two similar figures 1. 2. Identify corresponding sides and angles (highlight one example of each in the figures above) List the similarity rules (there should be 5!)

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Problem 1500

Test yourself 6
1. Find (i) the volume (ii) the total surface area of the given triangular prism.
2. Taking π=3.14\pi=3.14, find the area of the sector shown.
3. Find the area of the given parallelogram.

Hence find the value of hh.

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