請問有大神教教我嗎？！我不太會判斷這個 ！謝謝你🤯🥰急需要

Vy=9xt =10x4 斗向拋射的重要性質 = 2×10×16 : 80 (a) 6不計空氣阻力,在水平面將A、B兩球同時同地分別以仰角 V=30+50 =40 (考量水平,克) 37°與 53°拋出,若最大高度相等,如圖所示。有關兩球運動 B 的敘述哪些正確? 最大高度 最大高度相同 ⇒ 鉛直初速、飛行time一樣 (A) 在空中飛行時間相等(B)兩球鉛直方向的初速相同(C)A、B兩球的初速比為4: 3(D)A、B兩球的水平射程比為4:3(E)若二質點同時同地拋出,二質點在空中相遇。 +2X-10X30 RA VAL33XT Yasin ³° : VA Sin 53° = VA 4 在任一時刻,肉球高度相同, VB=3 水平位移苣不同3 =球x相撞. PB : VA (0353°XT 4 16 3x=9 = 4x5 7. 如圖所示,不計空氣阻力,在水平地面上以相同初速,不 60m 同仰角,先後斜拋同一物,第1次和第2次的最大高度分 別為20m及60m且水平射程相同。則有關此兩次的拋射, 下列敘述何者正確?(g=10m/s²) 20m 餘 免蘿田 最大高度較大者 (A)第1次在空氣中停留的時間較長(B)兩次拋射的仰角互補(C)第1次的仰角378 *(D)其初速量值為40m/s (E)水平射程為80m。 & R= 承山 2x40 Sin 30 (0330 80万 = (E 第二次98-6 V=Votat 軌跡方程式 9 0+2 ⇒20160 (Sino+(asè) Yo So 20 Vo Sina 60= 10* Sin (90°013 『體自地面斜向拋出,其軌跡方程式為x²-240x+180y=0(其中以地面為x軸、拋出點的 " 2g Volos *tano,

想問這題🙏

u 5.一物體質量m,以v的初速從仰角37°的斜面底端沿斜面上滑至最高點再下滑至斜面底 , 若物體與斜面間之動摩擦係數為0.25,重力加速度值為g,則 5V² 对你好 >14 (1) 物體上滑的最大位移為何? (2) 物體再落回斜面底端時的速率為何? 4 x ² x 1/2 = = mg 二 jhmy mgus 37 xo.ry = mg x + 1/7/2 f }/m Fm x10+ n-g mxle = wxh H 6mtime FJ Vo - V a = 8 5

想請問這四題

98. A baseball is hit straight up and is caught by the catcher 2.0 s later. The maximum height of the ball during this interval is: 4.9 m 2÷2=1 XA) B) C) D) E) 7.4 m 19.4 m 38.8 m 19.6 m 122. DA If the x component of a vector A, in the xy plane, is half as large as the magnitude of the vector, the tangent of the angle between the vector and the x axis is: A) √3 B) 1/2 C) √3/2 3/2 D) E) 3 142. Two vectors lie with their tails at the same point. When the angle between them is increased by 20° the magnitude of their vector product doubles. The original angle between them was about: A - B = |A|| B|cos O 2 L² cose = L² cos (0+20²) 2005 = cos@casso. sing sino A) 0 B) 18° C) 25° D) 45° E) 90° BA 158. Identical guns fire identical bullets horizontally at the same speed from the same height above level planes, one on the Earth and one on the Moon. Which of the following three statements is/are true? A) III only B) I and II only - 0-9 cose-adsint I. The horizontal distance traveled by the bullet is greater for the Moon. II. The flight time is less for the bullet on the Earth. III. The velocities of the bullets at impact are the same. I and III only II and III only 1.1 cos@=-035n9. tant = 1/3 C) D) E) I, II, III h-Vortat² xoxt-txt tu-Jite

在講什麼😀

A rope of mass M and length L hangs vertically. What is the time I needed for a pulse to travel from the bottom end to the support? (A) 0.5 (L/g)0.5; (B) (L/g) 0.5; (C) 2 (L/g) 0.5; (D) 2 (L/g); (E) None. Which statement in want for the 66t 220

Vmax 那個是公市嗎 我有點忘記了

m kg/m or hom No s 141 Q & A 31 12 k = 100 N/m 2 3 e te he e m= 100 kg 43 14 1 + 3 her 手面上作R / F 15 I IE the t R = 10 cm Z s. H.M, AJ & it to rettan 2 2 2 7 16 5 2 z 11 7 ton time in 4 to 7 z 12 h 17 7 N.S? w/10 FOOOooooool P000000 * Font ki 支招 R R 结 1.5 B, olo k D. J.O (El lo Vmax? v=o m 了 字 说 平 We J? Vmax ZAR Vmay (T-16 ) > 7 = 了 J = mat J = m ( I max-o)

21題 教教我QAQ

Section 11.3 Angular Momentum J-s behind rmv a he ur 265 = ? a ter 30. Example 11.1: A 58.1 Iw COMP string and whirled at 18. Express the units of angular momentum (a) using only the funda- momentum of magr mental units kilogram, meter, and second; (b) in a form involving the circular path. Fir newtons; (c) in a form involving joules. marw horizontal and (b) the 19. Use data from Appendix E to make an order-of-magnitude esti- 31. Example 11.2. A stai mate for the angular momentum of our Solar System about the Max 27 the end of its lifetime galactic center. mu = 17.293 of radius 4.96 X 10' 20. A gymnast of rotational inertia 63 kg•m? is tumbling head over heels dwarf of radius 4.21 with angular momentum 460 kg•m?/s. What's her angular speed? 17.99 acted on the core, fine A 660-g hoop 95 cm in diameter is rotating at 170 rpm about its 32. Example 11.2: Astro 22. A 1.3-th-diameter golf ball has mass 45 g and is spinning at central axis. What's its angular momentum? L: 1W=0-66*(0-95) x 140x277.10 km and determin core that collapsed to 3000 rpm. Treating the golf ball as a uniform solid sphere, what's ing with a period of 4 its angular momentum? 18-3 33. Example 11.2. The s 10-598 rpm With her arms outstre Section 11.4 Conservation of Angular Momentum tational inertia is 3.5 23. A potter's wheel with rotational inertia 6.20 kg•m? is spinning (Fig. 11.6b), her rot freely at 20.0 rpm. The potter drops a 2.50-kg lump of clay onto her final spin rate? L = 6 2 x 2-1 = 12-99~13 - 2x2 22 13= 60.48)" x 2.5 W W = 2 . X z W = 20x2T 60 ²2.1 ~ 1 12.574

第21題 到底要怎麼寫ಥ_ಥ

Section 11.3 Angular Momentum J-s behind rmv a he ur 265 = ? a ter 30. Example 11.1: A 58.1 Iw COMP string and whirled at 18. Express the units of angular momentum (a) using only the funda- momentum of magr mental units kilogram, meter, and second; (b) in a form involving the circular path. Fir newtons; (c) in a form involving joules. marw horizontal and (b) the 19. Use data from Appendix E to make an order-of-magnitude esti- 31. Example 11.2. A stai mate for the angular momentum of our Solar System about the Max 27 the end of its lifetime galactic center. mu = 17.293 of radius 4.96 X 10' 20. A gymnast of rotational inertia 63 kg•m? is tumbling head over heels dwarf of radius 4.21 with angular momentum 460 kg•m?/s. What's her angular speed? 17.99 acted on the core, fine A 660-g hoop 95 cm in diameter is rotating at 170 rpm about its 32. Example 11.2: Astro 22. A 1.3-th-diameter golf ball has mass 45 g and is spinning at central axis. What's its angular momentum? L: 1W=0-66*(0-95) x 140x277.10 km and determin core that collapsed to 3000 rpm. Treating the golf ball as a uniform solid sphere, what's ing with a period of 4 its angular momentum? 18-3 33. Example 11.2. The s 10-598 rpm With her arms outstre Section 11.4 Conservation of Angular Momentum tational inertia is 3.5 23. A potter's wheel with rotational inertia 6.20 kg•m? is spinning (Fig. 11.6b), her rot freely at 20.0 rpm. The potter drops a 2.50-kg lump of clay onto her final spin rate? L = 6 2 x 2-1 = 12-99~13 - 2x2 22 13= 60.48)" x 2.5 W W = 2 . X z W = 20x2T 60 ²2.1 ~ 1 12.574

我算出了加速度 但是沒有質量我要怎麼求摩擦係數

1 02. 汽車以72 kin/h 之速度行駛,煞車後滑行 10 m而停止,若g=10 m/s?,則: (A)輪與路面的摩擦係數為0.2 (B)輪與路面的摩擦係數為2 (C若汽車載重增大, 則滑行距离住曾大面若汽車載重增大,滑行距離將減小(D)若車速增為2倍,滑 距離將增為4倍 hz EY 8=20²2raxio a 50

我算出來加速度是2後 接下來怎麼解呢？

一質點沿江軸做等加速度運動,當t=1、2、3S時,其位置分別為6、12、20cm 則該質點的初速度為: a=2 AX X (A)0 (B)2 (C)3 (D) 4 (E) 6 cm/s 6 Vi+YX 6

18題，感謝

10. [2D and 3D motion] Show that the potential energy U(r) ofFa particle of nass jat aa distance r(> 員 from a planet of Inass 4 and radins 戶話 11. [The cross product] Caleulate the cross product A x B, assuming that A and B both lie in the x-y plane and have the respective nonzero components 4,, 4, and 妖,, 且, 12. [Angular momentum] Show that 主r, the instantaneous position ofa particle of mass mu with respect to a certain origin O, is parallel to its acceleration dv/吧, then the time Tate of change of the angular Inoimentum L with respect to the given origin vanishes 13. [Theorem 了 Show that the torque-angular momentum formnla _箇 7二 is also valid for a two-particle system 放 the origin lies at the center of mass 14. [Theorem IIH] Two particles of respective Inass ml and 2 are connected to the ends of amassless rod and Inove in the uniform gravitational field g ofthe earth. (a) What is the acceleration of their center of nass Telative to a Newtonian origin O? (b) Show that the angular Inomentum of the two particles about their center of nass 生 aconstant of the motion. 15. [Moments of inertia] Calculate the moment of inertia ofathin, uniform rod of mass m and length / about an axis perpendicular to the rod and at a distance q from one end. 16. [Rotation about a fixed axis] Consider the rotating cylinder in Figure, and suppose that A7 sg, Fo 三 0.6 Nt, and @ 二 0.2m, Calculate (a) The torque 7 acting on the cylinder (b) Ti ngular aceeleration q of the cylinder 17. [Work and kinet: instant Totat eenergy] A 40-kg homogeneous sphere of radius 10 cm is at acertain about ashaft through its center at 600 rpm. Assuining that a constant fric itude ets so that the sphere comes to rest in 10 seconds, Calculate th tional torque ofthis torque. 18. [The physical pendl end and allowed to oscillate freely in a horizontal plane (see Figure) m] A uniform Tod of Inass ru and length / is suspended at one (a) What is the period of this physic lpendulum for small amplitudes? (b) Ithe velocity u0 of the mass ce Hulum is initially released at rest in a horizontal position。what is the er at a subsequent instant when the Tod is vertical? (ec) Calculate the vertical and the horizontal components of the force on the rod at the point of suspensic 19 and rotations] Analyze the motion of a homogeneous sphere of mass 和7 and Tadius dq, which rolls without slipping down a fixed inclined plane of angle # 20. of angular momentum] A Inan has ainoment of inertia 五 about the = axis. He is originally at Test and standing on asinall platform which can turn freely. Ifhe is handed a wheel which is rotating at and has anoinent of inertia 了about its spinning axis, determine his angular velocity 放 (a) he holds the wheel upright, (b) turns the wheel out 9 二 90?, and (c) turns the wheel downward, 9 二 180?. Neglect the effect of holding the wheel a distance d away from the z axis