大学微积分题目? 大学微积分的题目?
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朋友,你好!完整详细清晰过程rt,希望能帮到你解决问题
d/dx(sin(log(2 x))) = cos(log(2 x))/x
大学微积分题目其实在高中的数学基础上更加深了难度 因为高中学的只是一些基础向导积分的话,如果微积分是要在导积分的基础上,再进行深入的学习
你好,这道题是复合函数求导,根据复合函数求导法则来看,这道题的求导结果如下:1/x*cos(ln2x)
绛旓細鍙互鑰冭檻绉寲鍜屽樊鍏紡锛岃鎯呭鍥炬墍绀
绛旓細濡傚浘鎵绀
绛旓細鍥犱负 sin(n蟺/2) 涓 鏁存暟 n 鐨勫彇鍊兼湁寰堝ぇ鐨勫叧绯汇傚綋 n 涓哄伓鏁版椂锛宻in(n蟺/2) = 0锛涘綋 n = 4k + 1 鏃讹紝sin(n蟺/2) = 1锛涘綋 n = 4k + 3 鏃讹紝sin(n蟺/2) = -1 鎵浠ワ紝e^sin(n蟺/2) 鐨勫间細闅忕潃 n 鐨勫彉鍖栬屽湪 1/e,銆1銆乪 鍜 1 涔嬮棿寰幆鍙樺寲銆傚洜姝わ紝杩欎釜鏋侀檺涓嶅瓨鍦...
绛旓細x瓒嬩簬姝f棤绌锋椂 x鍜寈-5閮借秼浜庢鏃犵┓ 鑰屼笖浜岃呮鏁伴兘鏄1娆 鏋侀檺鍊兼樉鐒朵负1 鎴栬厁/锛坸-5锛=1/锛1-5/x锛夋樉鐒5/x瓒嬩簬0锛岄偅涔堜唬鍏ユ瀬闄愬艰秼浜1
绛旓細浣犵殑绗簩涓绉垎鐪嬬湅棰樼洰鏈夋病鏈夋妱閿欙紝鍖呭惈浜嗚繖鏍蜂竴涓」: 绉垎(e^(x^2))鏄笉鑳界敤鍒濈瓑鍑芥暟琛ㄨ揪鐨勶紝鍏朵粬鐨勮鍥剧墖瑙g瓟锛岀粨鏋滈兘缁忚繃浜嗚绠楁満楠岃瘉锛屽彲浠ヤ繚璇佹纭
绛旓細鐨勬瀬闄愶紝绛変簬1.绗簩棰樹护x=tant锛屽垯鍒嗘瘝鍙樻垚浜(tant)^2sect锛宒x=(sect)^2dt, 涓绾﹀垎鍙樻垚浜唖ect/(tant)^2=cost/(sint)^2 dt, 涓婇檺鍙樻垚pi/3锛屼笅闄愬彉鎴恜i/4.鐒跺悗鍑戝井鍒嗗彉鎴怱1/(sint)^2dsint, 瀹冪殑绉垎鏄-1/sint锛屼唬鍏ヤ笂涓嬮檺鐩稿噺寰-2/鏍瑰彿3+鏍瑰彿2锛岃В寰楃粨鏋滄槸(3鏍瑰彿2-2鏍瑰彿3)/3....
绛旓細t - 鈭<1, x+t>e^(-u^2)du = 0, t=0 鏃 鈭<1, x>e^(-u^2)du = 0锛屽緱 x=1 涓よ竟瀵 t 姹傚锛屽緱 1 - (1+dx/dt)e^[-(x+t)^2]=0,瑙e緱 dx/dt = 1/e^[-(x+t)^2] -1 = e^[(x+t)^2] -1, (dx/dt)<t=0锛寈=1> = e-1 鍒 d^2x/dt^2 = 2...
绛旓細2.浜岄噸绉垎闂锛屽厛鐪嬬Н鍒嗗尯鍩燂細D锛歺^2+(y-1)^2=1 x^2+(y-2)^2=2^2 鏃㈢劧鏄洿绾匡紝鍙︿袱涓簲鏄細y=x y=鈭3x 鐢诲浘锛氶夌敤鏋佸潗鏍囷細鍘熷紡=鈭玔蟺/4,蟺/3]d胃鈭玔2cos胃,4cos胃]蟻^3d蟻 =1/4鈭玔蟺/4,蟺/3]蟻^4[2cos胃,4cos胃]d胃 =60鈭玔蟺/4,蟺/3](cos胃)^4d...
绛旓細df = f(x + dx) - f(x)鍥犳锛宒(3x) = 3(x+dx) - 3x = 3dx 甯告暟鑳藉鎻愬彇鍑烘潵鍥犱负锛歞(cf) = cf(x + dx) - cf(x) = c ( f(x + dx) - f(x) ) = cdf
绛旓細涓よ竟姹傚锛屽緱 2f(x)+1 = f ' (x)锛屽湪宸茬煡绛夊紡涓彇 x = 0 锛屽緱 0 = f(0) - 1锛屽洜姝 f(0) = 1 銆傚湪涓婂紡涓彇 x = 0 寰 2f(0) + 1 = f ' (0) 锛屽洜姝 f ' (0) = 3 銆
