自然科學 大學 8個月以前 答案如圖 9.47 A frictionless pulley has the shape of a uniform solid disk of mass 2.90 kg and radius 10.0 cm. A 1.60 kg stone is attached to a very light wire that is wrapped around the rim of the pulley (Fig. E9.47), and the system is released from rest. (a) How far must the stone fall so that the pulley has 3.30 J of kinetic energy? (b) What percent of the total kinetic energy does the pulley have? 01442m 47.6% Figure E9.47 T M mg 10 A 116 1.50 kg stone 2.9 2.50 kg pulley 待回答 回答數: 0
自然科學 大學 8個月以前 答案如圖 9.47 A frictionless pulley has the shape of a uniform solid disk of mass 2.90 kg and radius 10.0 cm. A 1.60 kg stone is attached to a very light wire that is wrapped around the rim of the pulley (Fig. E9.47), and the system is released from rest. (a) How far must the stone fall so that the pulley has 3.30 J of kinetic energy? (b) What percent of the total kinetic energy does the pulley have? 01442m 47.6% Figure E9.47 T M mg 10 A 116 1.50 kg stone 2.9 2.50 kg pulley 待回答 回答數: 0
數學與統計 大學 8個月以前 (大一微積分) 請問這題這樣寫正確嗎?背流程寫的😅,圖一為需用到的定義 正確的話,想問紅色圈圈的1是怎麼來的? DEFINITION Let f be a function defined on some open interval that con- tains the number a, except possibly at a itself. Then we say that the limit of f(x) as x approaches a is L, and we write lim f(x) = L x→a if for every number &> 0 there is a corresponding number 8 >0 such that | ƒ(x) − L| < ɛ if 0 < x-a <8 then 待回答 回答數: 0
數學與統計 大學 11個月以前 想問上面那題,為什麼區間是0、10? 從哪裡得出來的 1-6-8 中間值及勘根定理 片 1 例題:【中間值定理】 給函數f(x) = x+x+1,證明必定存在一實數c,使得f(c)=100。 解: 因 f(x) = x+x+1為一個多項式,所以在[0,10]區間上連續 因為f(x) = x* + x+1在閉區間[0,10]上連續, 又(0)=1<100<1001 = f(10) 所以由中間值定理,必定存在一實數c,使得f (c)=100。 ↳s 例題:【勘根定理】 證明方程式x-2x²+x+1=0,在(-1,1)區間內至少有一個實根。 證: 已解決 回答數: 1
數學與統計 大學 12個月以前 請問這題求dy/dx的時候,為什麼不能用隱含數微分法來微? 例1 Find the area of the surface generated by revolving the curve 6xy=x+3 from | |x=1 to x=3 about the x-axis. 【100 成大】 x++3x² 解:6.xy = x + 3 > y= dv 1 1+(2)2 =₁/1+ 1+-x dx 4 所求表面積為 = 1 + 6x 6 2x 1 + 24x² 1 1 2 dy 1 -- dx 2 1 +--- 2x² x+ = 1 2x² 1 ·x² +· 2 2x² 已解決 回答數: 1
數學與統計 大學 12個月以前 請問這題的Y hat=.22X+4.75 這個算式 是怎麼算出來的🥹🥹 r-Izxzy N SY b= xxx 5x a=y-bx 有八位學生的成績如下表,試計算其 SSt、SSreg、SSres 再根據所計算的結果求 決定係數及疏離係數。 f = .22X + 4.75 r² = SSreg SSt [學生 測驗一X 測驗二Y = A|B|C|D|E F G H 6 5 3 7 9 7 5 4 1.73 18 9+7+5+4+5+6+7+5 8 Y = = 學生 | A|B|C|D|E|F|G|H| |預測分數Ÿ 6.07 5.85 5.41 6.29 5.63 6.51 6.73 5.41 SSt = Σ(Y-V)² = 9 +1 +1 + 4 + 1 + 0 + 1 + 1 = 18 = SStres = (Y - Y) = 8.58 +1.32 +0.17+5.24+0.40+0.26 + 0.07 + 0.17 = 16.21 SSreg: Σ(Y− 1)² = 0.00 +0.02 +0.35 +0.08 +0.14 +0.26 +0.53 +0.35 = 1.73 = V0.901 = 0.95 |SSres SSt V1-r2: = 0.096 = =6 4 8 - 5 |16.21 18 6 397 3 5 待回答 回答數: 0
商業與管理 大學 約1年以前 求解 19 An annuity-due has the following present value and accumulated value: | = 13.987 Find i n+2 a = 51.632 待回答 回答數: 0
數學與統計 大學 約1年以前 教我這題的c~ 3. (30%) 假設{X,……, X} 爲隨機樣本, 其共同分配爲 (0, 2)2=(n-1)-1, 試回答下列各小題: (未附詳細計算過程或說明理由者,一律不予計分) Elvar) (a) 請問 62 是否爲的不偏估計式? (10%) (b) 請問 2 是否爲 2 的一致估計式? (10%) (c) 請問(n-1)62/02 的實際分配爲何? (10%) var exi n²- var ( 尚未解決 回答數: 1
數學與統計 大學 1年以上以前 請問第11題怎麼算 In Exercises 5 through 18, sketch the given region RAS and then find its area. 5. R is the region bounded by the lines y = x, y = -x, and x = 1. 6. R is the region bounded by the curves y = x², y = -x², and the line x = 1. 7. R is the region bounded by the x axis and the -x² + 4x - 3. curve y = 8. R is the region bounded by the curves y = e, .ar y = ex, and the line x = In 2. 9. R is the region bounded by the curve y = x² - 2x and the x axis. [Hint: Note that the region is below the x axis.] .85 10. R is the region bounded by the curve y the lines y = x and y = = X 8 1 11 and 11. R is the region bounded by the curves y = x² - 2x and y -x² -x² + 4. 已解決 回答數: 1
數學與統計 大學 1年以上以前 求解!拜託! A06. 微分運算 2 高階導數 與 絕對值 (A) 1. 2. 若f(x)=- 若 y=(x + 1),則 y'''(1)=6 16 求 SM(4)= 3/16 VX 3. y=(15x+3x²)6 £ y(¹4)(√√17) = 0 4. 5. x-1 設 f(x)= ,求 f'(1)=1/2 與 f"(0)=-4 x+1 若f(x)=3x-2x² -150 求f'(1)=-8 6. 若f(x) =3x^ −12x²| 求 f(1)=12 與 f'(2) 不存在 7. 若 y=|x-5x| 求y™(1) =276 尚未解決 回答數: 1