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Archive / Math

Angles

Problem 301

You start at a bearing of 30 degrees and turn left to 290 degrees. How many degrees did you turn?

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Problem 302

Identify the true properties of parallelograms from these options: A. Adjacent sides congruent, B. Opposite angles congruent, C. Opposite angles parallel, D. Opposite sides parallel, E. Consecutive angles supplementary, F. Diagonals bisect each other.

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Problem 303

Which quadrilaterals have opposite angles that are always congruent? Check all that apply: A. Parallelogram B. Square C. Quadrilateral D. Rhombus

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Problem 304

Find (a) the complement and (b) the supplement of an angle measuring 171517^{\circ} 15^{\prime}.

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Problem 305

Find the complement and supplement of an angle measuring 221322^{\circ} 13^{\prime}.

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Problem 306

What is the angle in degrees that corresponds to 92360\frac{92}{360} of a full turn in a circle?

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Problem 307

Find xx. x=x=

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Problem 308

Find mHm \angle H.
Write your answer as an integer or as a decimal rounded to the nearest tenth.

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Problem 309

What is the value of aa ? a=a=

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Problem 310

Find mVm \angle V.
Write your answer as an integer or as a decimal rounded to the nearest tenth.

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Problem 311

Use the figure below to answer the question. What is the measure of angle 1+1+ angle 2 ?

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Problem 312

Angle Pairs - Item 20549 One angle is 3636^{\circ}. What is the measure of its complement? CLEAR 5454^{\circ} 6464^{\circ} 144144^{\circ} 324324^{\circ}

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Problem 313

Trapezoid UU is a scaled copy of trapezoid TT.
Trapezoid T What is the value of ss ? \square Submit

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Problem 314

Find the value of xx.

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Problem 315

Use the figure to complete each part. (a) Write two other names for QMP\angle Q M P. \square and \square (b) Name the vertex of PMN\angle P M N. \square (c) Name the sides of 1\angle 1. \square and \square

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Problem 316

11. A line through (3,5)(3,5) and (k,12)(k, 12) is perpendicular to a line through (0,7)(0,7) and (2,10)(2,10). Find the value of kk that makes the above statement true.

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Problem 317

i.

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Problem 318

ABCA B C гурвалжны AA оройг дайрсан шулуун BCB C талыг DD цэгт огтолно. Хэрэв BAC=48\angle B A C=48^{\circ} ба CAD=8\measuredangle C A D=8^{\circ} бол BAD\measuredangle B A D өнцөг хэд байх вэ?

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Problem 319

A 127°

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Problem 320

4. Shown below is a quadrilateral.
Work out the size of the angle marked x .

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Problem 321

Класс еОВЛагерь Pernov́ Отряд
3

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Problem 322

A circle is centered on point BB. Points A,CA, C and DD lie on its circumference.
If ADC\angle A D C measures 6262^{\circ}, what does ABC\angle A B C measure? \square

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Problem 323

2. Identify the special name for each angle pair. a) 2\angle 2 and 3\angle 3 b) 2\angle 2 and 5\angle 5 c) 2\angle 2 and 6\angle 6 d) 6\angle 6 and 3\angle 3 e) 1\angle 1 and 3\angle 3 f) 7\angle 7 and 14\angle 14

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Problem 324

o. A diagram is shown, where k/fk / f and mm Is a transversal.
Move statements and reasons to the table to prove that <1<5<1 \equiv<5. \begin{tabular}{|l|l|} \hline Statements & \multicolumn{1}{|c|}{ Reasons } \\ \hline 1.kI1 . k \| I & 1. Given \\ \hline 2. & \begin{tabular}{l}
2. Corresponding angles \\ are congruent. \end{tabular} \\ \hline 3. & 3. \\ \hline 4.154 . \angle 1 \geqq \angle 5 & 4. \\ \hline \end{tabular} 12<1<31<4<2<3\angle 1 \cong \angle 2<1 \cong<3 \quad \angle 1 \cong<4 \quad<2 \leftleftarrows<3 24252634\angle 2 \cong \angle 4 \quad \angle 2 \equiv \angle 5 \quad \angle 2 \cong \angle 6 \quad \angle 3 \equiv \angle 4 354546\angle 3 \cong \angle 5 \quad \angle 4 \cong \angle 5 \quad \angle 4 \cong \angle 6 Transitive property Symmetric property Vertical angles are congruent. Straight angles form a linear pair. Corresponding angles are congruent. Alternate exterlor angles are congruent.

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Problem 325

Section 2: Angles of Triangles HOMEWORK
1. Find each measure. m1=m2=m3=\begin{array}{l} m \angle 1= \\ m \angle 2= \\ m \angle 3= \end{array}
3. Find each measure. m1=m4=m2=m5=m3=\begin{array}{ll} m \angle 1= & m \angle 4= \\ m \angle 2= & m \angle 5= \\ m \angle 3= & \end{array}

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Problem 326

A, B, C and D are four points on the circumference of a circle. TA is the tangent to the circle at A. Angle DAT =30=30^{\circ}. Angle ADC=132\mathrm{ADC}=132^{\circ}. a) Calculate the size of angle ABC . Explain your method: b) Calculate the size of angle CBD. Explain your method. c) Explain why AC cannot be a diameter of the circle.

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Problem 327

Question Watch Video Show Examples CNW\triangle C N W can be mapped onto TYE\triangle T Y E by a reflection. If mN=117\mathrm{m} \angle N=117^{\circ}, find mT\mathrm{m} \angle T.
Answer Attempt 1 out of 2 mT\mathrm{m} \angle T \square be determined.
Submit Answer /005e4a159a8a0c010d7d877a3de375c0 Nov 22 11:12

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Problem 328

```latex \text{Determine which figure shows vertical angles.} \\ \text{a)} \\ \text{b)} \\ \text{c)} \\ \text{d)} \\ \text{e)} \\ \text{f)} \\
\text{Figure } \square \text{ shows vertical angles.} ```

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Problem 329

On a map, Haven Rd and Pine Rd are parallel, and Mills Rd is a transversal. How can the value of xx be determined?
Alternate exterior angles are supplementary, so x=43x=43^{\circ}.
Corresponding angles are supplementary, so x=137x=137^{\circ}.
Alternate exterior angles are congruent, so x=137x=137^{\circ}.
Corresponding angles are congruent, so x=43x=43^{\circ}.

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Problem 330

These figures are congruent. What is mVm \angle V ?

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Problem 331

Regardless of how the graph is oriented in the standard (x,y)(x, y) coordinate plane, NO graph in one of the following categories has a vertical line of symmetry. Which one? F. Line G. Square H. Pentagon J. Parallelogram K. Scalene triangle

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Problem 332

AIVGLE RELATIONSHIPS STUDY GUIDE Solve each of the problems below. Be sure to ask questions if you need more help with a topic. ICANIDENIIFY ANGLE RELATIONSHPS WHEN PARALIE LINES ARE CUT BY TRANSVESALS. 8.80 Lines XX and YY are parallel lines aut by transversal, AA. In 151-5, identify the type of angle relationship shown in the following pairs of angles.
1. Angle I and Angle 8 \qquad
2. Angle 6 and Angle 7 \qquad
3. Angle 8 and Angle 4 \qquad
4. Angle 3 and Angle 5 \qquad
5. Angle 1 and Angle 5 \qquad
Using the pioture above, identify whether the following poirs of angles are conaruent or

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Problem 333

I CAN USE FACTS ABOUT THE EXTERIOR ANGLES OF TRIANGLES TO SOLVE PROBLEMS. 8.8D
20. Four students wrote facts on their dry erase boards about the angle relationships in triangles using the diagram below. Which student wrote a statement that is not true?
CHELSEA BOBBY
KATIE m1+m3=m5m \angle 1+m \angle 3=m \angle 5
MARK m2+m3=m4m \angle 2+m \angle 3=m \angle 4
21. Find the value of xx. x=x= \qquad
22. Find the measure of HTL\angle H T L.
23. Find the measure of CYL\angle C Y L.

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Problem 334

AIVGLE RELATIONSHIPS UNIT TEST Solve the problems below. Be sure to show your thinking. \begin{tabular}{l|l} \\ Use the parallel lines cut by a transversal & 1. Which of the following is not a true \\ \hline \end{tabular}
2. Which pair of angles is an example of supplementary angles? A. Angle 1 and Angle 7 B. Angle 3 and Angle 6 C. Angle 2 and Angle 7 D. Angle 1 and Angle 4 A. Angles 1 and 5 are corresponding angles. B. Angles 2 and 7 are alternate interior angles. C. Angles 5 and 8 are vertical angles. D. Angles 3 and 7 are corresponding angles.
3. Label the following statements as true or false: \qquad a. m3+m5=180m \angle 3+m \angle 5=180 \qquad b. m2+m6=180m \angle 2+m \angle 6=180

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Problem 335

4. Which equation could be used to find the value of xx in the triangle below? A. 12x+20=18012 x+20=180 B. 12x=18012 x=180 C. 12x20=18012 x-20=180 D. 8x10=4x+108 x-10=4 x+10
5. Find the mULEm \angle U L E in the triangle below.
6. In triangle ABC,mA=40A B C, m \angle A=40^{\circ} and mB=80m \angle B=80^{\circ}. Which of the following triangles is simitar to triangle ABCA B C ? A. BB. C. D.

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Problem 336

7. Which of the following is a true statement about the angles in the figure below? A. The m3m \angle 3 is 142142^{\circ}. B. The m1m \angle 1 is 9999^{\circ}. C. The m2m \angle 2 is 137137^{\circ}. D. The m4m \angle 4 is 137137^{\circ}.
9. Lines AA and BB are parallel lines. Find the measures of angles 1,2 and 3 . a. m<1=m<1= \qquad b. m2=m \angle 2= \qquad
8. Lines AA and BB are parallel lines cut by a transversal. Find the value of xx.
10. Which of the following describes two triangles that are similar to ane another? A. Triangle 1:m1=67,m2=151: m \angle 1=67^{\circ}, m \angle 2=15^{\circ} Triangle 2: m1=15,m2=95m \angle 1=15^{\circ}, m \angle 2=95^{\circ} B. Triangle 1:ml=24,m2=1011: m \angle l=24^{\circ}, m \angle 2=101^{\circ}
Triangle 2: m1=65,m2=101\mathrm{m} \angle 1=65^{\circ}, \mathrm{m} \angle 2=101^{\circ} C. Triangle 1:m1=45,m2=801: m \angle 1=45^{\circ}, m \angle 2=80^{\circ}
Triangle 2: m1=59,m2=45m \angle 1=59^{\circ}, m \angle 2=45^{\circ} D. Triangle 1:m1=71,m2=321: \mathrm{m} \angle 1=71^{\circ}, \mathrm{m} \angle 2=32^{\circ}
Triongle 2:m1=71,m2=772: m \angle 1=71^{\circ}, m \angle 2=77^{\circ}

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Problem 337

4. Find the measure of B\angle B :-

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Problem 338

16. In the figure below, lines AA and BB are parallel.
Find the m5m \angle 5 if m1=75m \angle 1=75^{\circ} and m3=40m \angle 3=40^{\circ}. A. 34,11734^{\circ}, 117^{\circ} and 2929^{\circ} B. 31,10631^{\circ}, 106^{\circ} and 4343^{\circ} C. 37,12837^{\circ}, 128^{\circ} and 1515^{\circ} D. 29,8429^{\circ}, 84^{\circ} and 6767^{\circ}

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Problem 339

The angle of depression to one side of a lake, measured from a balloon 2500 feet above the lake as shown in the accompanying figure, is 4343^{\circ}. The angle of depression to the opposite side of the lake is 2727^{\circ}. Find the width of the lake. a. 3605.101 ft b. 3957.735 ft c. 7237.814 ft d. 5787.778 ft

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Problem 340

ometry W. 12 Inscribed angles 98U98 U
What is mTm \angle T ?

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Problem 341

Convert the angle 224222^{\circ} 42^{\prime} to decimal degrees.

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Problem 342

Convert the angle 8036-80^{\circ} 36^{\prime} to decimal degrees.

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Problem 343

Is this true? The degree measure of a minor arc equals the measure of its central angle. A. Yes B. No C. Maybe D. Sometimes E. Not applicable

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Problem 344

Find the smaller angle between clock hands at 1:25.

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Problem 345

Convert the angle α=733916\alpha=73^{\circ} 39^{\prime} 16^{\prime \prime} to decimal degrees.

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Problem 346

Convert the angle α=18.8211\alpha=18.8211^{\circ} to degrees, minutes, and seconds.

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Problem 347

For a regular 20-sided polygon, what is the rotation angle in degrees? Use the formula 360n \frac{360}{n} where n=20 n = 20 .

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Problem 348

Find the angle bb at the center of a circle with a 295-degree arc.

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Problem 349

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 350

Find xx, m<SQR>m<SQR>, and m<PQT>m<PQT> given PQT=4x+43PQT = 4x + 43 and SQR=7x20SQR = 7x - 20 are congruent.

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Problem 351

Find xx if angles <R<R and <S<S are complementary with m<R=(9x7)m<R=(9x-7) and m<S=(7x+1)m<S=(7x+1).

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Problem 352

Find the value of xx if angles <R<R and <S<S are complementary, with m<R=(9x7)m<R=(9x-7) and m<S=(7x+1)m<S=(7x+1).

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Problem 353

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

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Problem 354

Gregor drives up a 1515^{\circ} hill for 5 km5 \mathrm{~km}. What is the vertical rise? Round to the nearest metre.

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Problem 355

Find the value of xx in a triangle where an exterior angle is 144 degrees and one interior angle is 93 degrees.

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Problem 356

The supplement of an angle is 20 more than three times the angle. Find the measures of the angles.

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Problem 357

A man on a 150-ft building sees a car move with angles of depression 2525^{\circ} and 4545^{\circ}. Find the distance traveled.

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Problem 358

A boat travels at 40 knots on a course of 6565^{\circ} for 2 hours, then 155155^{\circ} for 4 hours. Find the distance and bearing from Fort Lauderdale.

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Problem 359

Find the smaller angle between clock hands at 5:25.

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Problem 360

Convert the angle 104810^{\circ} 48^{\prime} to decimal degrees.

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Problem 361

Calculate 90415790^{\circ} - 41^{\circ} 57^{\prime}.

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Problem 362

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 363

Find the complementary angles where one is (3x9)(3x-9)^\circ and the other is (6x)(6x)^\circ. Their sum is 9090^\circ.

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Problem 364

Find the supplementary angle if the smaller angle is (12x+1)(12x+1)^\circ. Supplementary angles sum to 180180^\circ.

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Problem 365

Find the supplementary angle if one angle is (17x+5)(17x+5) degrees. Their sum is 180180^{\circ}.

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Problem 366

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 367

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 368

In parallelogram HIJKH I J K, the measure of angle HH is 4545^{\circ}. a. Find the measure of angle JJ.
Type the answer in the box below.
Angle JJ has a measure of \square !.
Explain how you know. Type your response in the space below.
B II U ■ 非 1=1= 2=2=
Type here

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Problem 369

(k) Prove that bisectors of any two adjacent angles of a parallelogram are at right (ii) Prove that bisectors of any two opposite angles of a parallelogram are parallel. (iii) If the diagonals of a quadrilateral are equal and bisect each other at right angles, then prove that it is a square. (i) If ABCD is a rectangle in which the diagonal BD bisects B\angle \mathrm{B}, then show that ABCDA B C D is a square. (ii) Show that if the diagonals of a quadrilateral are equal and bisect each other a

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Problem 370

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 371

In triangle DEF,mED E F, m \angle E is three times mDm \angle D, and mFm \angle F is 99^{\circ} less than mEm \angle E. What is the measure of each angle?
Find the m<D=m<D= \square Find the m<E=m<E= \square Find the m<F=\mathrm{m}<\mathrm{F}= \square

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Problem 372

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 373

Score: 4/54 / 5 Penalty: 1 off
Question Show Examples 1\angle 1 and 2\angle 2 are vertical angles. If m1=(4x+13)\mathrm{m} \angle 1=(4 x+13)^{\circ} and m2=(7x+4)\mathrm{m} \angle 2=(7 x+4)^{\circ}, then find the value of xx.
Answer Attempt 1 out of 2 \square Submit Answer

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Problem 374

Find the measure of 2\angle 2 given that m1=(2x+29)\mathrm{m} \angle 1=(2 x+29)^{\circ} and m2=(3x17)\mathrm{m} \angle 2=(3 x-17)^{\circ}, where they are vertical angles.

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Problem 375

Find the value of xx if 1\angle 1 and 2\angle 2 are vertical angles with m1=(2x2)\mathrm{m} \angle 1=(2x-2)^{\circ} and m2=(3x15)\mathrm{m} \angle 2=(3x-15)^{\circ}.

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Problem 376

Find xx if mPQR=x+9m \angle PQR = x + 9, mSQR=x3m \angle SQR = x - 3, and mPQS=100m \angle PQS = 100.

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Problem 377

If JKLPQR\triangle \mathrm{JKL} \cong \triangle PQR and m<P=52m<P=52, m<Q=48m<Q=48, m<R=80m<R=80, find m<Km<K. A. Cannot be determined B. 80 C. 52 D. 48

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Problem 378

Find the measure of angle DOT\mathrm{DOT} if OGundefined\overrightarrow{\mathrm{OG}} bisects DOT\angle D O T, with m1=6x+41m \angle 1 = 6x + 41 and m2=9x1m \angle 2 = 9x - 1.

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Problem 379

Find mABCm \angle ABC if mABC=6x4m \angle ABC = 6x - 4, mCBD=3x+2m \angle CBD = 3x + 2, and mABD=34m \angle ABD = 34.

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Problem 380

If 12\angle 1 \cong \angle 2 and m1=2x+10m \angle 1=2x+10, m3=120m \angle 3=120^{\circ}, find xx. How many degrees in a line?

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Problem 381

If 1\angle 1 complements 2\angle 2 and m1=23m \angle 1=23^{\circ}, what is m2m \angle 2?

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Problem 382

If 12\angle 1 \cong \angle 2 and m1=2x+10m \angle 1=2x+10, m3=120m \angle 3=120^{\circ}, find xx.

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Problem 383

How many degrees must a gate arm move from 4242^{\circ} to reach a horizontal position?

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Problem 384

Copy angle ABC onto ray DE to create angle FDE. Draw ray DF, then use compass to create points J and F.

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Problem 385

What is the best definition of an angle?

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Problem 386

1. [\#241] Sailing - wind speed 1 poin
A sailor sailing due north at 5 knots observes an apparent wind moving at 5 knots directly from the boat's starboard (right hand) side, i.e. at 9090^{\circ} to the axis of the boat. What is the 'true' wind speed? (i.e. what is the speed of the wind with respect to the ground?).
The 'true' wind speed is \qquad knots.
Enter answer here

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Problem 387

78\frac{7}{8} of a revolution represents how many radians?

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Problem 388

10. How many degrees are there in: (a) three right angles (b) 45\frac{4}{5} of a straight angle (c) 45\frac{4}{5} of a complete angle (d) two straight angles
11. Construct each of the following angles with the help of a protractor. (a) 3030^{\circ} (b) 7272^{\circ} (c) 9090^{\circ} (d) 115115^{\circ} (e) 165165^{\circ} (f) 2323^{\circ} (g) 180180^{\circ} (h) 4545^{\circ}

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Problem 389

Focus 1 Explain why vertically opposite angles are equal.

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Problem 390

Given the following information, determine which lines, if any, are parallel. State the theorem that justifies your answer. 16\angle 1 \cong \angle 6 A) pqp \| q; Converse of Corresponding Angles Theorem B) pqp \| q; Alternate Interior Angles Converse C) ghg \| h; Converse of Corresponding Angles Theorem D) ghg \| h; Alternate Interior Angles Converse

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Problem 391

A million years ago, an alien species built a vertical tower on a horizontal plane. When they returned they discovered that the ground had tilted so that measurements of 3 points on the ground gave coordinates of (0,0,0),(1,1,0)(0,0,0),(1,1,0), and (0,2,3)(0,2,3). By what angle does the tower now deviate from the vertical? \square radians.

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Problem 392

Find mm if 1\angle 1 and 2\angle 2 are vertical angles with m1=17x+1m \angle 1=17x+1 and m2=20x14m \angle 2=20x-14.

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Problem 393

Convert the angle α=625941\alpha=62^{\circ} 59^{\prime} 41^{\prime \prime} to decimal degrees.

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Problem 394

Convert the angle 38.3238.32^{\circ} to degrees, minutes, and seconds.

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Problem 395

Convert the angle α=77.8211\alpha=77.8211^{\circ} to degrees, minutes, and seconds.

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Problem 396

Find (a) the complement and (b) the supplement of the angle measuring 201820^{\circ} 18^{\prime}.

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Problem 397

Angles AXBAXB and BXCBXC are supplementary. Find the measure of angle AXBAXB. Options: (A) 162162^{\circ} (B) 146146^{\circ} (C) 3434^{\circ} (D) 1818^{\circ}

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Problem 398

BDB D bisects ABC\angle A B C with mABD=(8x1)m \angle A B D=(8 x-1)^{\circ} and mDBC=(6x+5)m \angle D B C=(6 x+5)^{\circ}. Find mABDm \angle A B D.

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Problem 399

Find the value of x+y+z+wx+y+z+w given C=140\angle C = 140^\circ and angles AA, BB, DD, EE at intersection point CC.

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Problem 400

Given angles: B=30\angle B = 30^\circ, C=125\angle C = 125^\circ, find x+yx+y where A=y\angle A = y^\circ and D=x\angle D = x^\circ.

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