Coordinates

Problem 901

Find the slope of the line through points (5,3)(-5,3) and (3,6)(3,6) and state if it rises, falls, is horizontal, or vertical.

See Solution

Problem 902

Find the slope of the line through points (5,2)(-5,2) and (3,5)(3,5), and describe its direction (rises, falls, horizontal, vertical).

See Solution

Problem 903

Find the slope of the line through points (1,2)(-1,-2) and (5,6)(-5,-6), and describe its direction (rises, falls, horizontal, vertical).

See Solution

Problem 904

Calculate the slope of the line through points (1,2)(-1,2) and (4,5)(4,5); state if it rises, falls, horizontal, or vertical.

See Solution

Problem 905

Find the slope of the line through points (5,-9) and (7,5) and describe its direction (rises, falls, horizontal, vertical).

See Solution

Problem 906

Calculate the slope between points (5,2)(-5,2) and (6,6)(6,6); state if it's undefined and describe the line's direction.

See Solution

Problem 907

Determine the slope of the line through points (7,4)(-7,4) and (5,8)(5,-8) and describe its direction (rises, falls, horizontal, vertical).

See Solution

Problem 908

Calculate the slope of the line through the points (1,4)(-1,4) and (4,5)(4,5), and describe its direction.

See Solution

Problem 909

Question 6 Find the midpoint of the line segment with endpoints: (58,75)\left(-\frac{5}{8},-\frac{7}{5}\right) to (54,65)\left(\frac{5}{4},-\frac{6}{5}\right)
Midpoint == \square Give your answer as a point, using integers or reduced fractions for coordinates.
Question Help: \square Message instructor
Submit Question

See Solution

Problem 910

An elliptical arch has a height of 13 feet and a span of 38 feet. Place the arch on a coordinate plane with highest point at (0,13)(0,13), a) Find an equation for the ellipse,
Equation: x2361+y2169=1\frac{x^{2}}{361}+\frac{y^{2}}{169}=1 \quad ob b) Find the distance from the center to a point at which the height is 2 feet. You may enter an exact answer or an approximate answer rounded to 2 decimal places.
Distance: \square feet

See Solution

Problem 911

21. Find the coordinates of the midpoint of A(8,4)A(-8, -4) and B(5,6)B(-5, 6).
(a) (4,3)(4, 3) (b) (7,8)(7, 8) (c) (6.5,1)(-6.5, 1) (d) (4,5)(-4, -5) (e) (1,1)(1, 1)

See Solution

Problem 912

6. Open Response The graph of line mm is shown. Use the similar slope triangles to compare the slope of segment ADAD, the slope of segment DFDF, and the slope of line mm. (Lesson 3)

See Solution

Problem 913

Find a PQE of all spleves whose Centertes on y-aho

See Solution

Problem 914

18. If possible, determine the value(s) of kk in each case so that the line [x,y,z]=[k,4,6]+t[3,2,1][x, y, z]=[k,-4,-6]+t[3,2,1] and the plane x4y+5z=5x-4 y+5 z=-5 intersect at the given number of points. a) a single point b) an infinite number of points c) no points
19. Consider these lines. 1:[x,y,z]=[2,1,4]+t[1,3,1]\ell_{1}:[x, y, z]=[2,1,-4]+t[1,3,1]

See Solution

Problem 915

given number of points. a) a single point b) an infinite number of points c) no points
19. Consider these lines  Consider these lines 1:[x,y,z]=[2,1,4]+t[1,3,1]2:[x,y,z]=[1,3,k]+s[1,1,2]\begin{array}{l} \text { Consider these lines } \\ \ell_{1}:[x, y, z]=[2,1,-4]+t[1,3,1] \\ \ell_{2}:[x, y, z]=[-1,3, k]+s[-1,1,-2] \end{array} a) Determine an equation of the plane that contains 1\ell_{1} and is parallel to 2\ell_{2}. b) Determine a value of kk so that 2\ell_{2} lies in the plane. c) Determine a different value of kk so that 2\ell_{2} is 8 units away from the plane.
20. Find the distance between the parallel lines in each pair. a) 1:[x,y,z]=[2,5,4]+t[2,1,3]\ell_{1}:[x, y, z]=[2,5,4]+t[2,1,3]

See Solution

Problem 916

Find the coordinates of point YY that divides segment XZXZ (X(4,3)X(-4,3), Z(6,2)Z(6,-2)) one-fifth from XX to ZZ.

See Solution

Problem 917

Find point QQ on line segment PRPR from P(10,7)P(-10,7) to R(8,5R(8,-5) that divides it in the ratio 4:54:5. Options: A, B, C, D.

See Solution

Problem 918

Find the slope of the line through points J(1,-4) and K(-2,8). Options: A. -4 B. -2 C. 14-\frac{1}{4} D. 14\frac{1}{4} E. 4

See Solution

Problem 919

Find the midpoint of GH\overline{\mathrm{GH}} with endpoints G(14,3)G(14,3) and H(10,6)H(10,-6). Choices: A. (6,15)(6,-15) B. (2,92)\left(-2,-\frac{9}{2}\right) C. (12,32)\left(12,-\frac{3}{2}\right) D. (24,3)(24,-3) E. (18,12)(18,12).

See Solution

Problem 920

3. Draw line EF that passes through E(5,2)E(5,-2) and ha The slope 34-\frac{3}{4} can be written as 34\frac{-3}{4} \qquad So, the rise is Plot point E (5,2)(5,-2). -3 and the run is \qquad 4 From E, move: \qquad Mark a point F. 3/4-3 / 4
Draw a line through EF. a) Two lines

See Solution

Problem 921

Чему равен вектор a\vec{a} Выберите один ответ: a. (1;2)(-1 ; 2) b. (4;2)(4 ; 2) c. (1;2)(-1 ;-2) d. (1;4)(-1 ; 4) e. (1;2)(1 ; 2)

See Solution

Problem 922

What represents the average speed of a cat at point AA on a graph: xx-coordinate, yy-coordinate, slope, or distance?

See Solution

Problem 923

Find the midpoint of the segment with the following endpoints. (0,8)(0, 8) and (6,4)(6, 4)

See Solution

Problem 924

The vectors u\mathbf{u} and v\mathbf{v} have the same direction. a. Find u\|\mathbf{u}\|. b. Find v\|v\|. c. Is u=v\mathbf{u}=\mathbf{v} ? Explain. a. u=\|\mathbf{u}\|= \square (Simplify your answer. Type an exact answer, using radicals as needed.)

See Solution

Problem 925

If Ann is at 0, Ben is at either 4 or -4. Carol is 2 blocks from Ben. Find Carol's possible locations.

See Solution

Problem 926

Calculate the slope of the line through points (2,2) and (-3,4) using the formula y2y1x2x1\frac{y_2 - y_1}{x_2 - x_1}.

See Solution

Problem 927

Find the slope of the line through (0,-2) and (1,1). Use the formula m=y2y1x2x1m = \frac{y_2 - y_1}{x_2 - x_1}.

See Solution

Problem 928

Calculate the slope of the line through the points (-3, -2) and (1, 2) using the formula y2y1x2x1\frac{y_2 - y_1}{x_2 - x_1}.

See Solution

Problem 929

Calculate the slope of the line through the points (-1,-4) and (-4,3) using the formula y2y1x2x1\frac{y_2 - y_1}{x_2 - x_1}.

See Solution

Problem 930

Calculate the slope of the line connecting the points (4,1)(-4, -1) and (4,3)(-4, 3).

See Solution

Problem 931

Calculate the slope between the points (3, -4) and (-4, -1) using the formula y2y1x2x1\frac{y_2 - y_1}{x_2 - x_1}.

See Solution

Problem 932

Find the slope of the line through points (5,8)(-5,8) and (5,5)(-5,-5). What is the slope?

See Solution

Problem 933

Find the slope of the line through (5,1)(-5,1) and (5,7)(-5,7), then through (8,4)(8,4) and (8,4)(8,-4).

See Solution

Problem 934

Find the slope of the line through (4,6)(4,-6) and (4,6)(-4,-6). Then find the slope through (5,3)(-5,3) and (9,3)(9,3).

See Solution

Problem 935

A boulder is launched from a 60 m high cliff at 95 m/s. How far does it travel before hitting the enemy castle?

See Solution

Problem 936

A toy car rolls off a table at 3.25 m/s3.25 \mathrm{~m/s}. The table is 1.25 m high. Where will it land on the ground?

See Solution

Problem 937

Find the standard form of the equation of the hyperbola satisfying the given conditions. Foci at (0,2)(0, -2) and (0,2)(0,2); vertices at (0,1)(0,1) and (0,1)(0, -1) The equation is \boxed{}

See Solution

Problem 938

Find the equation of the parabola described below. Find the two points that define the latus rectum, and graph the equation. focus at (0,4)(0,4), vertex at (0,0)(0,0)
The equation of the parabola with vertex (0,0)(0,0) and focus (0,4)(0,4) is . \square (Use integers or fractions for any numbers in the equation.) The two points that define the latus rectum are \square . (Type ordered pairs. Use a comma to separate answers as needed.) Use the graphing tool to graph the parabola.
Click to enlarge graph

See Solution

Problem 939

問 78 次の球面の方程式を求めよ。 (1) 中心が点 A(1,2,5)\mathrm{A}(1,-\sqrt{2}, \sqrt{5}) で,原点を通る球面。 (2) 2 点 B(1,3,5),C(7,9,11)\mathrm{B}(1,3,5), \mathrm{C}(7,9,11) が直径の両端である球面. (3) 4 点 D(0,0,0),E(2,0,0),F(0,4,0),G(0,0,6)\mathrm{D}(0,0,0), \mathrm{E}(2,0,0), \mathrm{F}(0,4,0), \mathrm{G}(0,0,-6) を通る球面.

See Solution

Problem 940

題 59. 次の球面の方程式を求めよ. (1) 2 点 A(1,1,3),B(3,5,3)\mathrm{A}(1,-1,3), \mathrm{B}(-3,5,3) が直径の両端である球面。 2) 4 点 C(0,1,0),D(2,1,2),E(4,1,0),F(2,1,0)C(0,1,0), D(2,1,2), E(4,1,0), F(2,-1,0) を通る球面.

See Solution

Problem 941

1. The three cables (AD, AC and AB) are used to support the 40 kg flowerpot. Determine the force developed in cable AD.
a) 2220 N b) 763 N c) 262 N d) 77.7 N e) None of the above

See Solution

Problem 942

Find an equation for the hyperbola whose graph is below.

See Solution

Problem 943

4x+5y+4=04x + 5y + 4 = 0 (4,1)(-4, -1) Find the point on the line 4x+5y+4=04x + 5y + 4 = 0 which is closest to the point (4,1)(-4, -1). Answer is

See Solution

Problem 944

Find the equation of the line through the points (3,9)(-3,-9) and (5,9)(5,-9).

See Solution

Problem 945

Graph the equation using intercepts: 2x+y=42x + y = 4. Use the graphing tool and include a second point if needed.

See Solution

Problem 946

Find the slope between points (6,3)(6,3) and (7,8)(7,8) and determine the line's direction: vertical, rising, falling, or horizontal.

See Solution

Problem 947

Find the slope of the line through (6,3)(6,3) and (7,8)(7,8) or state it's undefined. Describe the line's direction: vertical, rising, falling, or horizontal.

See Solution

Problem 948

Find the midpoint and distance between the xx-intercept and yy-intercept of the line y=6x18y=-6x-18.

See Solution

Problem 949

Find the midpoint and distance between the xx-intercept and yy-intercept of the line y=6x18y=-6x-18.

See Solution

Problem 950

Find the equations of the lines passing through the given points: (1,2), (5,10); (3,5), (8,15); (-3,0), (0,3); (-2,0), (0,2).

See Solution

Problem 951

Find the slope for points (0, a) & (b, 0) and (-a, 0) & (0, -b). State if the line rises, falls, horizontal, or vertical.

See Solution

Problem 952

Graph the ellipse given below by dragging the vertices and co-vertices to the correct locations. x2+4y24=0x^{2}+4 y^{2}-4=0
Provide your answer below:

See Solution

Problem 953

38. Which equation represents the ellipse with vertices at (3,5)(3, -5) and (3,9)(3, 9) and with a minor axis of length 10 units?
A. (x3)225+(y+2)249=1\frac{(x-3)^2}{25} + \frac{(y+2)^2}{49} = 1
B. (x3)249+(y2)225=1\frac{(x-3)^2}{49} + \frac{(y-2)^2}{25} = 1
C. (x3)225+(y2)249=1\frac{(x-3)^2}{25} + \frac{(y-2)^2}{49} = 1
D. (x3)2100+(y2)2196=1\frac{(x-3)^2}{100} + \frac{(y-2)^2}{196} = 1

See Solution

Problem 954

2. [0/4 Points] DETAILS MY NOTES SPRECALC7 11.1.002. PREVIOUS ANSWERS ASK YOUR TEACHER PRACTICE ANOTHER
The graph of the equation x2=4pyx^{2}=4 p y is a parabola with focus F(x,y)=(F(x, y)=( \square ) and directrix y=y= \square focus F(x,y)=(F(x, y)=( \square ) and directrix y=y= \square . Need Help? Read It

See Solution

Problem 955

Graph the ellipse given below by dragging the vertices and co-vertices to the correct locations. x2+y225=1x^{2}+\frac{y^{2}}{25}=1
Provide your answer below:

See Solution

Problem 956

Find the distance between A (4,8)A\ (4, 8) and B (9,3)B\ (-9, 3). Round your answer to two decimal places. units

See Solution

Problem 957

Verifica di Matematica, dicembre 2024
A) Dati i punti A(2k;1)A(2k;1), B(k+3;k3)B(k+3;k-3) e C(4k,k)C(4-k,k) Si determini per quali valori del parametro reale kk:
1)il punto medio di ABAB appartiene all'asse xx (1 punto) 2)il segmento ACAC non interseca l'asse yy (1 punto) 3)il baricentro del triangolo ABCABC si trova sulla retta di equazione y=1xy=1-x (1 punto)

See Solution

Problem 958

B) Il parallelogramma ABCDABCD ha il vertice AA in (1;1)(1;1) il punto d'incontro delle diagonali PP in (4;3)(4;3), il vertice BB appartiene all'asse xx e alla retta di equazione x2y+2=0x-2y+2=0 1)Si determinino le coordinate dei vertici BB, CC e DD (1 punto) 2)Si calcolino perimetro ed area del parallelogramma ABCDABCD (1 punto)

See Solution

Problem 959

C) Dati i punti A(2;1)A(-2;1), B(1;1)B(1;-1), D(2;7)D(2;7), e la retta rr di equazione 2xy7=02x-y-7=0 1)Si determini la misura dell'angolo DAB (1 punto) 2)Si determinino le coordinate del punto CC appartenente a rr tale che i segmenti BCBC e ADAD siano paralleli (1 punto) 3)Si determini l'area del quadrilatero ABCDABCD (1 punto)

See Solution

Problem 960

D)Si determini la retta, appartenente al fascio proprio di centro (1;1)(1;1) che forma con le rette x+y+1=0x+y+1=0 e x=2x=2 un triangolo di area 2 (2 punti)

See Solution

Problem 961

[-/1 Points] DETAILS MY NOTES SPRECALC7 11.1.048.MI.
Find an equation for the parabola that has its vertex at the origin and satisfies the given conditions. Focal diameter 5 and focus on the negative yy-axis \square Need Help? Read It Watch it Master It Submit Answer

See Solution

Problem 962

7. Lines mm and nn are perpendicular, meaning they form a right angle. Draw similar slope triangles on each line and find the slope of each line. What conclusion can you draw about the slopes of perpendicular lines? They are different

See Solution

Problem 963

Find the distance between the pair of points. (3,4) (3,4) and (9,12) (9,12)
The distance between the points is ______ units. (Round to two decimal places as needed.)

See Solution

Problem 964

Find the distance between the points AA and BB given below. (That is, find the length of the segment connecting AA and BB.) Round your answer to the nearest hundredth.
1 unit \square units

See Solution

Problem 965

Calculate the distance between the points L=(3,1)L=(-3,-1) and K=(5,7)K=(5,-7) in the coordinate plane. Give an exact answer (not a decimal approximation).
Distance: \square
\sqrt{\square} \square \square

See Solution

Problem 966

Calculate the distance between the points (6,6)(6,-6) and (1,1)(-1,1). Options: 525 \sqrt{2}, 14\sqrt{14}, 7, 727 \sqrt{2}.

See Solution

Problem 967

Find the yy-intercept bb of the line through points (6,10)(6,10) and (15,22)(15,22).

See Solution

Problem 968

Sketch the polar coordinates (6,25π12)(-6, \frac{25 \pi}{12}).

See Solution

Problem 969

Graph the hyperbola from the equation 25x236y2900=025 x^{2}-36 y^{2}-900=0 using its transverse axis, vertices, and co-vertices.

See Solution

Problem 970

Find the hyperbola equation with vertices at (3,3)(-3,-3) and (7,3)(7,-3), and foci at (5,3)(-5,-3) and (9,3)(9,-3).

See Solution

Problem 971

Find a point that is 2\sqrt{2} units from (1,5)(-1,5).

See Solution

Problem 972

3. Which line segment most likely connects points located at (4,3)(-4, 3) and (4,3)(4, 3) on the coordinate grid above?
A PO B OG C GB D BP
4. A horizontal distance of 3 units is best described by the distance between \_\_\_\_\_\_\_\_\_\_\_\_
A point (4,3)(4,3) and the point (1,3)(-1,3) B point (0,3)(0,3) and the point (6,0)(6,0) C point (6,4)(-6,4) and the point (3,4)(-3,4) D point (3,6)(3,-6) and the point (3,9)(-3,-9)
Graph each point and find the horizontal distance between each.

See Solution

Problem 973

Find the distance from point A(9,3)A(-9,-3) to the line y=x6y=x-6. Round your answer to the nearest tenth.
The distance is about \square units.

See Solution

Problem 974

Find the distance from point A(14,5)A\left(-\frac{1}{4}, 5\right) to the line x+2y=14-x+2 y=14. Round your answer to the nearest tenth.
The distance is about \square units.

See Solution

Problem 975

Line tt has a slope of 45\frac{4}{5}. Line uu has a slope of 54\frac{5}{4}. Are line tt and line uu parallel or perpendicular? parallel perpendicular neither
Save answer Skip to next question

See Solution

Problem 976

Find the distance between the pair of points. 7) (3,1)(-3, -1) and (11,5)(-11, 5)

See Solution

Problem 977

Find the coordinates of point BB if the midpoint M(1,3)M(-1,3) and point A(3,2)A(3,-2) are given.

See Solution

Problem 978

Calculate the distance between the points (0,7)(0, 7) and (4,1)(4, 1) in simplest radical form.

See Solution

Problem 979

Calculate the distance between the points (2,7)(-2, 7) and (7,5)(7, -5) in simplest radical form.

See Solution

Problem 980

Calculate the distance between the points (9,5)(9, 5) and (5,4)(5, -4) in simplest radical form.

See Solution

Problem 981

Calculate the distance between the points (4,1)(-4,-1) and (1,9)(1,-9) in simplest radical form.

See Solution

Problem 982

Find the coordinates of a dot across the yy-axis from (3,6)(-3,-6) that is 8 units away.

See Solution

Problem 983

3. What is the distance between the points (2,5)(2,5) and (7,8)(7,8) ? [A] 25 [B] 1 [ट] 5.8 [D] 9 [E] 4

See Solution

Problem 984

Find the distance between points A and B . 3 3.61 13 4.58

See Solution

Problem 985

Let MM be a point of affix zz, in the plane, verifying the relation : z12i=z7+2i|z-1-2 i|=|z-7+2 i|
Determine the set (D) of points MM, in two different ways: a) Let z=x+iyz=x+i y and find an equation of (D). b) Use the points A of affix zA=1+2iz_{\mathrm{A}}=1+2 i and B of affix zB=72iz_{\mathrm{B}}=7-2 i to determine geometrically the set (D)(\mathrm{D}).

See Solution

Problem 986

Identify the intercepts. This question: 1 point(s) possible Submit test
Select the correct choice below and, if necessary, fill in the answer box to complate your choice. A. xx-intercept(s) == \square (Type an ordered pair. Use a comma to separate answers as needed.) B. There is no xx-intercept.
Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. yy-intercept(s) == \square (Type an ordered pair. Use a comma to separate answers as needed.) B. There is no yy-intercept.

See Solution

Problem 987

Graph the line given by the equation y=1y=-1 on the coordinate plane.

See Solution

Problem 988

Find the line equation in slope-intercept form: vertical line through the point (6.71,5.38)(-6.71,-5.38).

See Solution

Problem 989

Find the line equation through points (7,9)(-7,-9) and (4,8)(-4,-8).

See Solution

Problem 990

Find the equation of line LL that is perpendicular to y=45xy=\frac{4}{5} x and goes through the point (5,4)(5,4).

See Solution

Problem 991

Find the line equation ax+by=ca x + b y = c through (1,8)(1,-8), perpendicular to x+y=2x+y=2, with a,b,ca, b, c as coprime integers.

See Solution

Problem 992

5) A 860kg860-\mathrm{kg} Escalade traveling 40 m/s40 \mathrm{~m} / \mathrm{s} @ 120 degrees has a perfect inelastic collision with a 220 -kg mini-cooper traveling 22 m/s@7322 \mathrm{~m} / \mathrm{s} @ 73 degrees. Find with what velocity the two cars continue moving after the collision.

See Solution

Problem 993

1. Consider the parallelogram given by the coordinates P=(0,0,4),Q=(2,0,0)P=(0,0,4), Q=(2,0,0), R=(0,3,0)R=(0,3,0), and a fourth unknown coordinate SS, and additionaly we have QRQ R parallel to PS min (a) Determine the location of the point SS. (b) Calculate the area of the parallelogram P=PQRS\mathcal{P}=P Q R S. (c) Determine the equation of the plane containing the parallelogram. Please put you answer in the form of ax+by+cz=da x+b y+c z=d.

See Solution

Problem 994

What is the distance between point PP and point QQ ?
7 units
Distance is always positive or 0 . Absolute value is always positive or 0 . You can use absolute value to write an expression for the distance.
Which expression represents the distance between point PP and point QQ ? 42[3+2|4|-|2| \quad[|-3|+|2| 43|4|-|3| 4+3|4|+|-3|

See Solution

Problem 995

Construct free-body diagrams for the following objects; label the forces according to type. Use the approximation that g=10 m/s2g=-10 \mathrm{~m} / \mathrm{s}^{2} to determine the magnitude of all forces and the net force and acceleration of the object.
1. A 2-kg box is free-falling from the table to the ground. Fgravity =m1=2 kg1 m/s2F_{\text {gravity }}=m_{1}=2 \mathrm{~kg} \cdot 1 \mathrm{~m} / \mathrm{s}^{2} Fgav: 1 y = 20 N Fot =20 N=20 \mathrm{~N} a=Fmotm=20N2ky=10ys2a=\frac{F_{m o t}}{m}=\frac{20 N}{2 k y}=10 y_{s}{ }^{2}
4. A 500-kg freight elevator is descending down through the shaft at a constant velocity of 0.50 m/s0.50 \mathrm{~m} / \mathrm{s}.
2. An 8-N force is applied to a 2-kg box to move it to the right across the table at a constant velocity of 1.5 m/s1.5 \mathrm{~m} / \mathrm{s}.
5. A 500-kg freight elevator is moving upwards towards its destination. Near the end of the ascent, the upward moving elevator encounters a downward acceleration of 2.0 m/s22.0 \mathrm{~m} / \mathrm{s}^{2}.
3. An 8 -N force is applied to a 2kg2-\mathrm{kg} box to accelerate it to the right across a table. The box encounters a force of friction of 5 N .

See Solution

Problem 996

A parabola can be drawn given a focus of (1,9)(1,-9) and a directrix of y=5y=5. What can be said about the parabola?
Answer Attempt 1 out of 10
The parabola has a vertex at \square , \square ), has a p-value of \square and it \square Submit Answer

See Solution

Problem 997

Find the midpoint of the line segment joining the points P1\mathrm{P}_{1} and P2\mathrm{P}_{2}. P1=(3,3);P2=(5,3)P_{1}=(3,-3) ; P_{2}=(5,3)
The midpoint of the line segment joining the points P1P_{1} and P2P_{2} is \square . (Simplify your answer. Type an ordered pair.)

See Solution

Problem 998

Classify the points (4,0), (0,-5), and (9,-4) as x-intercept, y-intercept, or neither.

See Solution

Problem 999

Find the slope between the points (1,9)(-1,9) and (4,0)(-4,0).

See Solution

Problem 1000

Graph the solution for the inequalities: xy5x - y \geq 5 and x+y8x + y \leq 8 using a graphing tool.

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