Geometry

Problem 3201

10. Determine the coordinates of the vertices of the ellipse, using the following equation: x2289+y264=1\frac{x^{2}}{289}+\frac{y^{2}}{64}=1 (0,8)(0,8) and (0,8)(0,-8) (8,0)(8,0) and (8,0)(-8,0) (0,17)(0,17) and (0,17)(0,-17) (17,0)(17,0) and (17,0)(-17,0)

See Solution

Problem 3202

Exercice 29 (1 point) DD Au moment des soldes un affiches.
ATTENTION : Détaillez tous vos calculs
QUESTION N 1{ }^{\circ} 1 (4 points) A. La commune de Waterville possède une piscine municipale avec un bassin sportif de 25 m de longueur sur 12,5 m de largeur, et d'une profondeur de 2,4 m (uniforme dans tout le bassin), plan en annexe 1. Déterminez le volưne d'eau en litres nécessaire pour son remplissage. B. Le débit de la vanne d'arrivée d'eau est de 8,5 m3/8,5 \mathrm{~m}^{3} / heure. Calculez le nombre d'heures nécessaires

See Solution

Problem 3203

The graph of a function f is shown below. Find f(0). 6- 4 -6 3 4 X fƒ(0) = □ 6

See Solution

Problem 3204

Find an equation for the perpendicular bisector of the line segment whose endpoints are (1,6)(1,-6) and (7,6)(-7,6).

See Solution

Problem 3205

The cross-section of the prism below is a compound shape formed of two rectangles.
Work out the volume of the prism. Give your answer in cm3\mathrm{cm}^{3}.

See Solution

Problem 3206

Save \& Exit Certify Lesson: 7.4 11.1b Systems of Equations Ap... WILLIAM BURRIS
Question 2 of 10, Step 1 of 1 0/10 Correct 1
Two angles are complementary if the sum of their measures is 9090^{\circ}. Find two complementary angles such that the smaller angle is 5757^{\circ} less than 2 times the larger angle. (Round to two decimal places if necessary.)
Answer Keypad
How to enter your answer (opens in new window) Keyboard Shortcuts \qquad { }^{\circ} the smaller complementary angle \square - the larger complementary angle Submit Answer

See Solution

Problem 3207

The graph of the relation GG is shown below.
Give the domain and range of GG. Write your answers using set notation. domain == \square range == \square

See Solution

Problem 3208

Complete the calculation for the area of the triangle below. area =12×9×11×=\frac{1}{2} \times 9 \times 11 \times \square \begin{tabular}{|l|l|l|} \hline cos51\cos 51^{\circ} & cos57\cos 57^{\circ} & cos72\cos 72^{\circ} \\ \hline sin51\sin 51^{\circ} & sin57\sin 57^{\circ} & sin72\sin 72^{\circ} \\ \hline \end{tabular} Watch video

See Solution

Problem 3210

A ferris wheel is 32 meters in diameter and makes one revolution every 7 minutes. For how many minutes of any revolution will your seat be above 24 meters?
For \square minutes of any one revolution you will be above 24 meters. Preview My Answers Submit Answers

See Solution

Problem 3211

d center, foci and graph of 36x2+9y2+48x36y=7236 x^{2}+9 y^{2}+48 x-36 y=72

See Solution

Problem 3213

Pro = A(1,4) C Statements 1 AB BC 18-1-4 Reasons applicazion of the stopa Semula
3. draw the vortical line segment. AC 4/ABCzangrange
5. AABCs aright bange datinizon of perpendicula datiniton of a night age 6.BA = V1+ TİQJJ he deance simua 7 (v1+d²) + (√²²+1)-(de) Pagam

See Solution

Problem 3214

e5f215874d2e4c3b1c6796601 and blue dots along the x -axis and y -axis to graph 3x+3y=18-3 x+3 y=18.

See Solution

Problem 3215

2. In the figure below, every angle is a right angle.
What is the area, in square units, of the figure? A 902 B. 992 C. 1,092 D. 1,292

See Solution

Problem 3216

Find mOPNm \angle O P N.

See Solution

Problem 3217

Use the given points to find the slope of the line.
Enter your answers in the boxes m==m=\frac{\square-\square}{\square-\square}= \square

See Solution

Problem 3218

Math 15 Coordinate Geometry Quiz 1 Name: LUKA T. \qquad 1) State whether each point is in quadrant 1,2,3,41,2,3,4 or on the xx-axis or yy-axis. ( 1 mark each) a) (3,4)(-3,-4) b) (0,7)(0,7) c) (2,6)(2,6) d) (2,3)(-2,3) e) (2,0(-2,0 xx

See Solution

Problem 3219

3. Identify the curve by finding a Cartesian equation for the curve. a) r=2r=2 b) r=3sinθr=3 \sin \theta c) r=cscθr=\csc \theta

See Solution

Problem 3220

ZADANIE 5 Wyznacz pole obszaru ograniczonego krzywą: f(x)=1x2f(x)=\frac{1}{x^{2}} oraz prostymi y=1;y=4y=1 ; y=4

See Solution

Problem 3221

Complete parts (a) through (c) below. a. A storage pod has a rectangular floor that measures 21 feet by 12 feet and a flat ceiling that is 6 feet above the floor. Find the area of the floor and the volume of the pod. b. A lap pool has a length of 25 yards, a width of 23 yards, and a depth of 4 yards. Find the pool's surface area (the water surface) and the total volume of water that the pool holds. c. A raised flower bed is 35 feet long, 7 feet wide, and 1.8 feet deep. Find the area of the bed and the volume of soil it holds. a. The area of the floor of the pod is \square (Type an integer or a decimal.) The volume of the pod is \square \square (Type an integer or a decimal.) b. The pool's surface area is \square \square (Type an integer or a decimal.) The total volume of the water that the pool holds is \square \square (Type an integer or a decimal.)

See Solution

Problem 3222

Which figure has the same horizontal and vertical cross-sections? A C B D

See Solution

Problem 3223

A cylindrical can, open at the top, is to hold 410 cm3410 \mathrm{~cm}^{3} of liquid. Find the height and radius that minimize the amount of material needed to manufacture the can. Enter your answer with rational exponents, and use pi to represent π\pi.
Radius == \square Height = \square

See Solution

Problem 3224

Part 1 of 2 Points: 0 of 1 Save
Find the distance between the pair of points. Give an exact answer and a three-decimal-place approximation. (0,25) and (32,0)(0,-2 \sqrt{5}) \text { and }(3 \sqrt{2}, 0)

See Solution

Problem 3225

[Lecture] [Hostos CC] - WsveBrowser leview_ (Conic \& Trig) (Copy) - Personal - Microsoft Edge arson.com/Student/PlayerHomework.aspx?homeworkld=687507776\&questionld =2\&.flushed=true\& Bah Amina 12 A est 3 Review HW Score: 12.8 (Copy) Question 6, 8.2.11 points Points: 0 of
Graph the parabola using the vertex and the yy-intercept. y=(x1)22y=(x-1)^{2}-2 Click to enlarge graph /iew an example Get more help - Clear all Skil Alt

See Solution

Problem 3226

Graph the following inequality. yx2+6y \geq x^{2}+6

See Solution

Problem 3227

0 Mastery: 52\% Correct answers: 19/23 19/2319 / 23 2nd 2^{\text {nd }} Atter
Find the measure of the interior angle A
Type your answer in the boxes Desk 1 Sign out Nor 25 4:454: 45 US

See Solution

Problem 3228

Listen
Decide whether there is enough information to prove that WXZYZX\triangle W X Z \simeq \triangle Y Z X using the SAS Congruence Theorem. Explain your reasoning, yes; Because ZWXY,WY\overline{Z W} \simeq \overline{X Y}, \angle W \simeq \angle Y, and WXYZ\overline{W X} \simeq \overline{Y Z}, the two triangles are congruent by the SAS Congruence Theorem. yes; Because ZWXY,WY\overline{Z W} \simeq \overline{X Y}, \angle W \simeq \angle Y, and ZXXZ\overline{Z X} \simeq \overline{X Z}, the two triangles are congruent by the SAS Congruence Theorem. no; There is one pair of congruent sides and one pair of congruent angles, but there is no other pair of congruent sides. no; There are two pairs of congruent sides and one pair of congruent angles, but the angles are not the included angles.

See Solution

Problem 3229

Find the length of the hypotenuse of the triangle below. Round the answer to the nearest tenth.

See Solution

Problem 3230

2. Explain why multiplying the numbers in each expression gives us the area of the rectangle.

See Solution

Problem 3231

8. Slope from a Graph (4 marks)
Find the slope of the line in the following scenarios ( 2 marks each): a) Rise =6=6, Run =2=2 b) Rise =3=3, Run =9=9

See Solution

Problem 3232

33. Write the ordered pair that repesents the reflection of point JJ across the yy-axis.

See Solution

Problem 3233

36. Draw a line of symmetry on the figure shown. 4.G.3

See Solution

Problem 3234

Identify two segments that are marked congruent to each other on the diagram below. (Diagram is not to scale.)
Answer Attempt 1 out of 2 \square is congruent to \square

See Solution

Problem 3235

We want to construct a box whose base length is 3 times the base width. The material used to bui and bottom cost $10/ft2\$ 10 / \mathrm{ft}^{2} and the material used to build the sides cost $6/ft2\$ 6 / \mathrm{ft}^{2}. If the box must have a of 50ft350 \mathrm{ft}^{3} determine the dimensions that will minimize the cost to build the box.

See Solution

Problem 3236

On a record player, the centre of the record sits 22 cm from the base of the arm. There is a scratch on the record directly below the arm, 9 cm from the centre.
Consider the periodic function f where x represents time in seconds and yy represents the distance between the scratch and the base of the arm.
Given that it takes one second for the record to make a full revolution, sketch one cycle of this function.

See Solution

Problem 3237

3. Graph the system of equations on the coordinate plane. 2x+3y=9y=4x+1\begin{array}{l} 2 x+3 y=-9 \\ y=4 x+1 \end{array}

See Solution

Problem 3239

- This is the only question in this section.
Question Watch Video Show Examples
What is the slope of the line that passes through the points (2,8)(2,8) and (12,20)(12,20) ? Write your answer in simplest form.
Answer Attempt 1 out of 2 \square Submit Answer

See Solution

Problem 3240

I'aps Fanling tada; 6 IN .
Reflect the figure over the line y=1y=-1.
Plot all of the points of the reflected figure. You may click a plotted point to delete it.

See Solution

Problem 3241

The radian is an alternative unit to the degree for angle measurement. True False

See Solution

Problem 3242

Find the area of the shaded region. f(x)=20x+x2x3,g(x)=0f(x)=20 x+x^{2}-x^{3}, g(x)=0

See Solution

Problem 3243

9. A ski lodge is constructed with one side along a vertical cliff such that it has a height of 15 m , as shown. Determine an exact measure for the base of the lodge, bb.

See Solution

Problem 3244

2x+6y=102 x+6 y=10
17. y=7y=-7 x=2x=2
18. y=4x2y=4 x-2 x+4y=0-x+4 y=0 Write an equation in slope-intercept form of the line that passes through the grom point and is perpendicalar to the graph of the given equation.
19. (0,0);y=3x+2(0,0) ; y=-3 x+2
20. (2,3):y=12x1(-2,3): y=\frac{1}{2} x-1
22. (3,2);x2y=7(-3,2) ; x-2 y=7
23. (5,0);y+1=2(x3)(5,0) ; y+1=2(x-3)
21. (1,2);y=5x+4(1,-2) ; y=5 x+4
24. (1,6);x2y=4(1,-6) ; x-2 y=4
25. Urban Manning \wedge path for a new city park will connect the park entrance to Main Strevet. The path should be perpendicular to Main Strevet.

See Solution

Problem 3245

Math 19 Models and Word Problems Worksheet
1. A surveyor plants a stake on one side of a road that runs east to west. The surveyor then walks directly across the road, walks 5 meters to the east, and plants a second stake. The distance between the two stakes is 13 meters. If the surveyor continues to walk to the east a further 11 meters, what would the distance between the surveyor and the first stake be? (a) Begin by drawing a picture, labeling the position of all stakes and distances, including unknowns. Which variable are you solving for? Will there be any intermediate variables you will need to solve for before finding the final answer? (b) Use the Pythagorean Theorem to find the width of the road in meters. (c) Using the information you have, apply the Pythagorean Theorem to solve the original problem.
2. I own a ladder that is 20 feet tall and lean it up against a wall at an angle. The distance between the top of the ladder and the ground is triple the distance between the base of the wall and the bottom of the ladder. What is the distance between the bottom of the ladder and the base of the wall? (Round your answer to the nearest tenth of a foot.)
3. Bamboo is one of the fastest growing plants in the world. Suppose I plant some 15 inch bamboo in my garden. Assume for all parts of this problem that bamboo grows at 35 inches per day. (Amazingly, this is a low estimate for its growth rate!) (a) Write a linear model/function for the height of h(t)h(t) the bamboo as it relates to time tt in days where t=0t=0 is the day I planted it. (b) Express the height of the bamboo on the day that it was planted (c) I have a fence at the back of my garden that is 10 ft tall. How long will it be from the planting of the bamboo until it is as tall as my fence? (d) If we instead choose t=0t=0 to be the day that the bamboo is the same height as the fence, how will the model change? (e) How would the model change if we expressed the time tt in weeks instead of days?
4. The University of Golden Bears has been working on increasing its enrollment numbers since the year 2005. In 2010, the student population was 11,000 students and by 2020 , the student population was 14,000. (a) Write a function of time tt representing the population PP. Assume the growth of the student population was linear and use t=0t=0 at 2005. (b) What would the model be instead if t=0t=0 at 2010?

See Solution

Problem 3246

Find xx in similar triangles where AU=20x+108A U=20x+108, UB=273U B=273, BC=703B C=703, UV=444U V=444, AV=372A V=372, and AC=589A C=589. Show your work.

See Solution

Problem 3247

In PQRSTR\triangle PQR \cong \triangle STR, find PRQ\angle PRQ \cong A. RST\angle RST B. STR\angle STR C. SRT\angle SRT D. T\angle T

See Solution

Problem 3248

In congruent triangles ABC\triangle ABC and STR\triangle STR, complete BC_\overline{BC} \cong \_. Options: A. ST\overline{ST} B. SR\overline{SR} C. TR\overline{TR} D. AC\overline{AC}

See Solution

Problem 3249

What is the circumcenter of a triangle and what constructions help find it? A. all B. circumscribing circle C. inscribed circle D. balance.

See Solution

Problem 3250

In ABCSTR\triangle ABC \cong \triangle STR, complete CA\overline{CA} \cong ____. Options: A. AC\overline{AC} B. TR\overline{TR} C. RS\overline{RS} D. ST\overline{ST}

See Solution

Problem 3251

Calculate the area of a rectangle with length 94\frac{9}{4} and width 911\frac{9}{11}.

See Solution

Problem 3252

How many gallons of paint are needed to cover a silo with height 30 ft and radius 5 ft, using π=3.14\pi=3.14? Options: A. 13 B. 14 C. 11

See Solution

Problem 3253

After 4 seconds, where is the sprite located? Choose from: (25,-25), (-25,0), (0,25), (-25,25).

See Solution

Problem 3254

Find the intercepts, domain, range, and intervals of increase/decrease for the function ff with points (-3,3), (-2,0), (0,1), (2,0), (3,3). Is it even, odd, or neither?

See Solution

Problem 3255

An object with no width, length, or height is a(n): A. line B. ray C. angle D. point.

See Solution

Problem 3256

Nathan is building a rectangular toolshed. Find the area of the larger floor: l=9,w=5l=9, w=5 or l=7,w=7l=7, w=7.

See Solution

Problem 3257

Reflect the square CDEF with vertices C(3,2), D(10,2), E(10,9), F(3,9) over the line y=xy=-x.

See Solution

Problem 3258

Find the size of a square cardboard needed to create an open-top box holding 100in3100 \mathrm{in}^3 by cutting 44 in squares from each corner.

See Solution

Problem 3259

Find the dimensions of cardboard for a cube box with side length 4x4x inches and volume 100in3100 \, in^3.

See Solution

Problem 3260

Reflect points A(2,1),B(6,1),C(4,3)A(2,1), B(6,1), C(4,3) across the line y=3y=-3.

See Solution

Problem 3261

Calculate the area of a rectangle with length 14\frac{1}{4} and width 411\frac{4}{11}.

See Solution

Problem 3262

Find the new coordinates of points A(4,2)A(-4,2), B(7,1)B(-7,-1), and C(0,1)C(0,1) after reflecting across the xx-axis.

See Solution

Problem 3263

Find the length of a rectangular swimming pool with an area of 210 sq ft and a width of 9 ft. Use A=l×wA = l \times w.

See Solution

Problem 3264

What is the angle measure after rotating a 76-degree angle 180 degrees clockwise?

See Solution

Problem 3265

Translate (x,y)(x4,y+1)(x, y) \rightarrow(x-4, y+1) and reflect the result across the line y=1y=1.

See Solution

Problem 3266

A triangle AA has an area of 3 sq. units and a base of 3 units. A scaled copy has an area of 72 sq. units.
a. How much larger is the area of the copy than Triangle AA?
b. What scale factor did Lin use for the copy?
c. What is the length of the bottom side of the copy?

See Solution

Problem 3267

Calculate the mass of a spherical bullet with a diameter of 0.729 in, using lead density of 11,343 kg/m311,343 \mathrm{~kg} / \mathrm{m}^{3}.

See Solution

Problem 3268

Calculate how many 4.70 \AA molecules cover a baseball with a radius of 1.45 inches using A=4πr2A=4 \pi r^{2}.

See Solution

Problem 3269

How many 0.442 m20.442 \mathrm{~m}^{2} sod squares are needed to cover a 100 yd by 160 ft NCAA football field?

See Solution

Problem 3270

Calculate the unique spots a laser with diameter 4.05μm4.05 \mu \mathrm{m} can read on a DVD with a 4584 \frac{5}{8} inch diameter.

See Solution

Problem 3271

Find the volume in liters of a cylinder with a diameter of 941 in and height of 10 in using V=πr2hV = \pi r^{2} h.

See Solution

Problem 3272

Find the mass of water in a pool measuring 75ft×50.0ft×7.310ft75 \mathrm{ft} \times 50.0 \mathrm{ft} \times 7.310 \mathrm{ft} with sig figs.

See Solution

Problem 3273

Find the volume of a cylinder 3.769 mm high and 0.85 ft wide in cm3\mathrm{cm}^{3} using V=πr2hV=\pi r^{2} h.

See Solution

Problem 3274

Find the total area of a rectangular pool with dimensions 15ft, 20ft, 6ft, and 8ft (square + rectangle).

See Solution

Problem 3275

Find the volume of a cylinder with height 3.769 mm and width 0.85 ft in cm3\mathrm{cm}^{3} using V=πr2hV=\pi r^{2} h.

See Solution

Problem 3276

Calculate the total area of a pool with a square (15ft side) and a rectangle (20ft by 8ft).

See Solution

Problem 3277

Find the area of a triangle with base 20 in and height 18 in, and the area of a rectangle 20 in by 18 in.

See Solution

Problem 3278

Find QPS\angle \mathrm{QPS} if QPR=6x+6\angle \mathrm{QPR} = 6x + 6 and RPS=2x+4\angle \mathrm{RPS} = 2x + 4.

See Solution

Problem 3279

En un triángulo rectángulo, si CAD=(x+30)\angle CAD = (x+30)^{\circ} y BAD=90\angle BAD = 90^{\circ}, ¿cuánto mide BAC\angle BAC?

See Solution

Problem 3280

Determine if the ratio yr\frac{y}{r} is positive or negative for point (x,y)(x, y) in the first quadrant, where r=x2+y2r=\sqrt{x^{2}+y^{2}}.

See Solution

Problem 3281

The supplement of A\angle A is 129129^{\circ}. Find the complement of A\angle A. Options: 3939^{\circ}, 5151^{\circ}, 9090^{\circ}, 129129^{\circ}.

See Solution

Problem 3282

Encuentra mABCm \angle ABC sabiendo que mABC=6x4m \angle ABC= 6x-4, mCBD=3x+2m \angle CBD=3x+2, y mABD=34m \angle ABD=34.

See Solution

Problem 3283

Calculate the perimeter of CDE\triangle C D E with sides 2, 4, and 2 units. Round to the nearest hundredth.

See Solution

Problem 3284

Find mDOTm \angle D O T given OGundefined\overrightarrow{\mathrm{OG}} bisects DOT\angle D O T, m1=6x+41m \angle 1=6x+41, m2=9x1m \angle 2=9x-1.

See Solution

Problem 3285

A tree's shadow is 24 ft, and a 4-ft post casts a 6-ft shadow. What is the height of the tree?

See Solution

Problem 3286

Find the area and perimeter of a dining room measuring 97ft97 \mathrm{ft} by 23ft23 \mathrm{ft}.

See Solution

Problem 3287

Find xx, KLK L, and JLJ L given that KK is the midpoint of JLJ L where JL=4x2J L=4x-2 and JK=7J K=7.

See Solution

Problem 3288

Construct the perpendicular bisector of segment AB\overline{AB}. What's the first step? A. Half length arc. B. Greater than half. C. Less than half. D. Quarter length arc.

See Solution

Problem 3289

Construct the perpendicular bisector of segment AB\overline{AB}. What is the first step? A, B, C, or D? What is the second step? B or C?

See Solution

Problem 3290

Construct the perpendicular bisector of AB\overline{AB}.
After drawing an arc through AA, what’s the next step?
Final step options: Draw BX\overline{BX}, XY\overline{XY}, or locate MM.

See Solution

Problem 3291

Find the equation of line kk, perpendicular to y=15x+7y=\frac{1}{5}x+7, passing through (1,3)(-1,-3).

See Solution

Problem 3292

Draw the perpendicular bisector of segment AB, then vectors BX, segment AX, and line XY. Find midpoint M of AB. What does it look like?

See Solution

Problem 3293

What is the first step to construct the perpendicular bisector of segment AB\overline{AB} if it's already drawn? A. Draw an arc with compass at AA greater than 12AB\frac{1}{2} AB. B. Draw an arc with compass at AA of length 14AB\frac{1}{4} AB. C. Draw an arc with compass at AA of length 12AB\frac{1}{2} AB. D. Draw an arc with compass at AA less than 12AB\frac{1}{2} AB.

See Solution

Problem 3294

Construct the perpendicular bisector of segment AB\overline{AB}. What is the first step? A) Draw an arc from AA with radius > 12AB\frac{1}{2}AB.

See Solution

Problem 3295

Construct the perpendicular bisector of AB\overline{AB}. What is the second step and the final step of the construction?

See Solution

Problem 3296

Find the equation of line rr that is perpendicular to y=3x2y=3x-2 and passes through the point (1,3)(1,3).

See Solution

Problem 3297

Find the equation of line vv that is perpendicular to y=94x+1y=-\frac{9}{4} x+1 and passes through the point (3,2)(-3,2).

See Solution

Problem 3298

Sketch the figure for XY¨YZundefined\ddot{XY} \perp \overrightarrow{YZ}. What’s the first step: A, B, C, or D?

See Solution

Problem 3299

Construct a figure where XY\overline{XY} is perpendicular to YZ\overline{YZ}. What are the first and second steps?

See Solution

Problem 3300

Identify the mistake in concluding mPTR=50m \angle P T R=50 using angles (x+28)(x+28) and (2x+16)(2x+16). Choose A, B, C, or D.

See Solution
banner

Start learning now

Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

ParentsInfluencer programContactPolicyTerms
TwitterInstagramFacebookTikTokDiscord