Neste post serão mostrados alguns limites, derivadas e integrais importantes para o curso de Fis-14 além de propriedades importantes do cálculo, o modo como se chega aos resultados não será mostrado (Isso é importante para Mat-12 e não para Fis-14). Todos os símbolos matemáticos estão escritos em Latex utilizando o script tex the world do Greasemonkey, é recomendado o uso do browser Mozilla Firefox para visualização da página.
Propriedades ![[;\lim_{x \to p}f(x)=f(p);]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_u8ImuiI7dCHmDHJoBz4nzEZ_iKnws7yvKR_IAi0bVxUoXxsFiZvFHRQtrA0GuYUQkMdpwX-0MYbUmVlV0AqgPJLD1rhqjbrIahhJTDIRv7dtQCnzkLMpNKbLxVIgJdwyJCi0Kq=s0-d "\lim_{x \to p}f(x)=f(p)")
, definição de função contínua em p. ![[;\lim_{x\to p}(u+v)=\lim_{x\to p}u+\lim_{x\to p}v;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_ssfuDP6F-zpwr2SpXu3p_8mC0IRbU0zKipatQc4_mdP-UWUf1a0NWLU5EykA5x3Qq0RuHABij3RPJk71_avZzIvhDtfHq3oGRz1ywteGdarV7z5ecgAagGRi7oYdmQ9kQgf5GB8QQ0XA1pj4gvgDqqLIVkZ2HNIA1saVFs_k7_5MhAOgAuO4skHbKmtA=s0-d "\lim_{x\to p}(u+v)=\lim_{x\to p}u+\lim_{x\to p}v")
, limite da soma. ![[;\lim_{x\to p}(u\cdot v)=\lim_{x\to p}u\cdot \lim_{x\to p}v;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_v-iminUvJ42dhZZfDqW8Lmj2KCDuqkCI02pY_A4V8dVg4NZXuskaeVst6N8nLUTVk51RPOC6Nt4NzMPHROWiHSiTxkkzAfPedSaHwmQQ6qDxsWY63Sj8lDbdcNeVdS8kgvp9lmYHTFjVH8b1egvpILtfdr4A99RzKTKWej3R65L-8dyW-XrvxbAp8emfK-mjfwOn-9Dct6hfVdEg=s0-d "\lim_{x\to p}(u\cdot v)=\lim_{x\to p}u\cdot \lim_{x\to p}v")
, limite do produto. ![[;\lim_{x\to p}\left \frac u v \right = \left \frac {\lim_{x\to p}u}{\lim_{x\to p}v}\right;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_sIwFgBbrpKYawFPC3udra0bg-BssAVhbNHNi96LKTW2aZPEZIX_Lew_sjN46c1yaCB-B3H84JgXpgh6QVwywwtYGG1pk2MndAuzba5K4CRd7DFIr6fpEwBhdxWYkIYg7mAMJIdUikwEZr4fGT9DUSwmAnzygZkWe27P_LdXA4qBRv_E4oQkMJYE-A5Q1-Qof-2XqcFMcA9TwmdLFwt8GOG6qZYifEbgb4MABTbFNxP11wCnCpLzFmCW7X7Wng23AAOtMYFQzLSCFc=s0-d "\lim_{x\to p}\left \frac u v \right = \left \frac {\lim_{x\to p}u}{\lim_{x\to p}v}\right")
, limite do quociente. ![[;\lim_{x\to p}(u^n)=\left (\lim_{x\to p}u \right )^n;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_ttHeyu4syRe-CcuLDl9BY0HoFMSaPNsGBXAgqjLJV0FV7kmrY9tTY7eEbrALC2dy9z36bbEWQCMhQazuELs5NM7A7AP9R8_ycPqAIliHsfs5w_9g0jkJSdVQEPDDzvEtJXg_PU1J9ElzZoaMZqg9ZrVZtFOqsSJ6BBJLA9LgZ5CirH0_Ixfh-HenSeyVjUF-4=s0-d "\lim_{x\to p}(u^n)=\left (\lim_{x\to p}u \right )^n")
, limite da potência. ![[;\lim_{x\to p}f(x)=\lim_{x\to p}g(x)=0 \Rightarrow \lim_{x\to p} \frac {f(x)}{g(x)}=\frac {\lim_{x\to p}f'(x)}{\lim_{x\to p}g'(x)};]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vFWcLVrS1gT68UrrhB2GmpeHEpN2GNT8SgQsOmwyMQlysZugC70AaI2KS0SaD6qq63JzDqMtPZ5LGrNMANAy_Y08rtSRoVL-aoSNMm5N1s9gKbrLBwRQPvd3QrFSFDnws2NMWVWA5YSm0tri5l5CnyPm0nG5ZdHrrgY2k2DzWHn87W7JMoyUg9yzt9-hcttceP4MFcu3unA-GcOWUa9BmmWVSUd68Jonhj7Kh_5ZHentJwaEp2ruUfF1LLLo3uPmEE0Zx-QQ0vvHrGJb0TqlT4_LN8A0DEtZ-GV2U2EWBPjnY3GAwHPOiCwb-eQ3Uz4VDJYcIP5xh9cWPJfpsIfrUhd0j_WsrSaK2T=s0-d "\lim_{x\to p}f(x)=\lim_{x\to p}g(x)=0 \Rightarrow \lim_{x\to p} \frac {f(x)}{g(x)}=\frac {\lim_{x\to p}f'(x)}{\lim_{x\to p}g'(x)}")
, regra de L'Hospital. ![[;f'(x)=\frac {dy}{dx}=\lim_{h\to 0}\frac {f(x+h)-f(x)}h;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_twE6Yt4Z8HjFrlMYf0lF02gqJzT_YAzek1sNZUig0g0sdTsXgozccynDZqztJeKUnyzPrRbBgnJ30Wm55f4e6mUgVfi0Vb3-_dqSvVCNx9FZ7o8qE57bf4oDm4JjXGJmq4XENxg5SpFy8UWNx3gI78t694XwvwtoBlKRy4Ogs4xdVveuhkQNr3FVo7i4iqANyy8ti2hg=s0-d "f'(x)=\frac {dy}{dx}=\lim_{h\to 0}\frac {f(x+h)-f(x)}h")
, definição de derivada. ![[;d(u+v)=du+dv;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vOhrQ_KCPBTjaIo6hAbBkMzb8ZH3YbXqHeWIYYCxuUkpj3qkE4-Ef92Vsb-zMag8HN_TJSYsZQliR0QS8J29TfCnYg628bd6tq0LL0lXiaxw=s0-d "d(u+v)=du+dv")
, derivada da soma. ![[;d(u\cdot v)=vdu+udv;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vhae9SaOl5xle_Em0hVZLptjvYgTG1Vn_9ZV68j90wA_oMaP29VV4q0EiS4nYh2gdPUA4nP4G6hwrFjEKTFbRov0AuoVKzkx5eMlX1VooYdvBRj_sf8j1pbvs=s0-d "d(u\cdot v)=vdu+udv")
, derivada do produto. ![[;d \frac u v = \frac {vdu-udv}{v^2};]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_sYu37V2HZHm3wvMyCf7sE1UlaoqIkVT1r9jQzlngR0mLFld2nHKDzunXpYKozkf_eXG0nXEWK3r-SnMMsXjkm3Ke9zhpA3-yRyXK6LzlNJeK0Wy_V_-liyPR-B7dmRbQp6_7jmrS0E4JRUWTNloEoRI8PUE3I=s0-d "d \frac u v = \frac {vdu-udv}{v^2}")
, derivada do quociente. ![[;h(x)=f(g(x)) \Rightarrow h'(x)=f'(g(x))\cdot g'(x);]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vVp5m61yf_DNmqDjQhAwZ0EK8pXplP6rdBn2xS1VrQE-waD1cErtHS9oCgDopiXaa8z20AcmZx9wq8y58lwY_-NU5TBBcf28gX1N056bZ64rUylDrW2swQU8waJRm6lagK7l_sdybTZNN9OY1xIzekiAxhFZ4j1nO-6GAwCQ=s0-d "h(x)=f(g(x)) \Rightarrow h'(x)=f'(g(x))\cdot g'(x)")
, derivada da função composta (regra da cadeia). ![[;g(x)=f^{-1}(x) \Rightarrow g'(x)=\frac 1 {f'(g(x))};]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_uFDvBdGzTlH2JcZEnMDR0vWRHuTxDSs585BBCGVqEDdY05f_I9baqqtxC-4CKl9R2SQu_MTlmvugYdlyWMnLS29EyPlfgXcTgV0Hx7BAYM04jIFHRpxdcwjzcFdHzAaL-tWbjwhD5M76FNxwtk8IBVFaahQ09Ue93W2VWJHjKNyVlc-LUhYGbp=s0-d "g(x)=f^{-1}(x) \Rightarrow g'(x)=\frac 1 {f'(g(x))}")
, derivada da função inversa. ![[;\int_b^a f(x)\cdot dx=\lim_{\Delta x\to 0}\sum_{i=0}^nf(x_i)\cdot \Delta x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_sOy7RWPja4xMUb6RB7KvMwNFl5NL_BcpTT9bFhPblhDFpje32Z_phoKL5DQ2QRIpHsTapOJ5Pzbl6XKwNMHGVhvh11MCg7Z9Kf7MEMYyLl0h8t1C01ws1zG9Pj41UGP2DltJK_jNkrycq4ZupEIycp7QRDvOUEyb2S_H0qUHqIxoIflq52XsPqKWQFz1LRe1ekmlMFL9mMO_ggh4aU5THx5K_u_tOLZcARczZdMQA=s0-d "\int_b^a f(x)\cdot dx=\lim_{\Delta x\to 0}\sum_{i=0}^nf(x_i)\cdot \Delta x")
, integral de Riemann. ![[;\int_a^b f(x)\cdot dx=\int_a^cf(x)\cdot dx+\int_c^bf(x)\cdot dx;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_sEnsHfc_yK8tcVDW62BEPOHmXYHIX7-aBRxQxmHoQoYfyiTN0l6c0nCnu1Sz1ci1TLrpyoc7IDTT0-eDNQlwclgkl95B9yKAepu1qaelKB-jqXA9faIe3NXfn2kmuYeAuBMEkrO2iXqc96j6XQxdAelU6U6HUG3kluMlhuKK_teILAe6MU6nLH8KEodeaDy9SUaKpXy8o=s0-d "\int_a^b f(x)\cdot dx=\int_a^cf(x)\cdot dx+\int_c^bf(x)\cdot dx")
![[;\int (u+v)\cdot dw=\int u \cdot dw + \int v \cdot dw;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_sFVAt4kTk9lpr4hvvLzqJ4IRYlVJ82W-7oNZnZhUepl4smyzA6FXrCmogiiDxZ4loVFp4c6J3Rl1WhKQfaYAR41JOtSppPg3ufMLLTi1H9-kFV5XcBk8tJnaFE1xdp8q0PWTXl6rE2qe3VpI92pd0haTQFM4X4PMKyciK3I1JLV7AdbD3r=s0-d "\int (u+v)\cdot dw=\int u \cdot dw + \int v \cdot dw")
, integral da soma. ![[;\int u\cdot dv=u\cdot v - \int v\cdot du;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vj_Y93XVESfBlgyRYAizjq-1hibQP_S6sofF3dqezZ3iZO1RDkyymXx5zy2dPf0OTSxEESo8mhljuqmMFjQNx3g23UcD3a8YQ1Vjmr9Z4_hw6WW9MUVRE3j_kx_CZHRhqb5KrwlfwecAT4zMWatrc8J8hS1R2B=s0-d "\int u\cdot dv=u\cdot v - \int v\cdot du")
, integração por partes. Alguns limites importantes
![[;\lim_{x\to 0} \frac {\sin x}x =1;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_to7nYAs2FlumTyQbE85fgwhs9paE3Hc6oHOaQYI8PDS-7j0jrM_4u6zhEv--CKV7RwCCqIw-zdXDsciaNT5yJ4rQ6Y8xIz4dcjluj_8gEJdiHQFqeiD7pad-tWpW6Y5amTEY804HxOs2FN8PsPl9EoeINhH2E=s0-d "\lim_{x\to 0} \frac {\sin x}x =1")
, limite trigonométrico fundamental. ![[;\lim_{x\to \infty}\left(1+\frac a x \right) ^x=e^a;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_s3Z0LbTakptS-nyGyFErWxEh4r12RxFsJp_NPu1RtVoVgrDlhQ-fbX5scxvQtmjArWArW1MiLiRZS3X7SSXPMBIC2oxul_4p4-tLgbPDBmu2_wfCSEvHYV65GfB4pxL6p6LUfhhzPYIppcQuppWQfEyDDw10x0s9FqK9k25q_ZLjbmUxSq1gREzCcD=s0-d "\lim_{x\to \infty}\left(1+\frac a x \right) ^x=e^a")
, limite exponencial fundamental. ![[;\lim_{x\to +\infty} \sqrt[x]{x}=1;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_t56Rh94fPf1iFGSJM2bBcRL_1iQBLNb0BCEvXxjBXJPXztEjcpzdOlb8iCv3y8cmibLbVvTGAjW6uPCVo8J0ioTslAWWJL7VagTVRI_ApHrmkL7oKqVl-jGowSn8aMnvyaVCoAeJncszEaVn5c0mSuUet2LLgM6r2CkA=s0-d "\lim_{x\to +\infty} \sqrt[x]{x}=1")
![[;\lim_{x\to 0}\frac {a^x-1}x=\ln a;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_u9Y_32xBw2F0-9Fj4Dy2KNFO2SNO-3XJaWtdpArCn91g44_Iit4_gZmmpGqO6ke_5jAu6VVuD5PySWjVTUL0dVJlmsoFEJsfHREyEWDcgjqxi1ncOe-bvrtzlgH-sUjD2kw3_oZsZwpe8-1SAjIaawvV0HD-26OE8=s0-d "\lim_{x\to 0}\frac {a^x-1}x=\ln a")
Algumas derivadas importantes
![[;dc=0;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_sigonI2c2coqO_z4oZEvP0Dj9sAovw7HsYYOiDbWBkDnTLnZS3grluecDxrimCeVcV5TfbZuQC0xystY4YAC_8Lmmqs0FRolMg=s0-d "dc=0")
, derivada da função constante.
![[;dx^a=a\cdot x^{a-1};]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_s1Z1mlOTnhJjUhJdpJzF9Ll9JqO3K4y3L_q746hck5btIZ93d8FfZcrFfbE0sud0b3MWAY3JFJZyeq3OH30_y8c480Ne11f8SUdJdegfoeAQUY2LzSzJnSyK0Uz2_hgJ1g=s0-d "dx^a=a\cdot x^{a-1}")
![[;da^x=\ln a\cdot a^x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_u877ChHZ4qnusjH82eOeC4rxbvk_GPTWFjLoZL1UwvGST55trgB_PJYNKsouvZSKayna-gefbkK2RmyDNdNMxa4-azSOUiSKllB9-av2mH9GrC4cMV0KIelq154SzWotE=s0-d "da^x=\ln a\cdot a^x")
![[;d\ln{|x|}=\frac 1 x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_u7_bMjQ7HOM1MWzz5nHLnyXeeEEoPfGVYX5Tay-Ee-GVXauwOPVhxIMVWoqA1lCy6nu_-ZL_ODjGsC0kxGSUXDYfTvByegyD5lmKXHXi3hBs9zg_REMSBJhB5q1xKI0pFG_L5M=s0-d "d\ln{|x|}=\frac 1 x")
![[;d\sin x = \cos x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_sJAyfFvrxRrmFkOeVX2TNu2vC0TpTLpjlzj8j4C3HV18owMIHz4tyrTP7B_cxJMuCX19yGGNlGSe1it5eVqv1S6826ObN13KoQIImJ-unYv-rY-xEL4GmI=s0-d "d\sin x = \cos x")
![[;d\cos x = -\sin x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_u3-JA9xtplTWE3UEkLjKC0lmdnpLIQO43LGHciQhxG1OMsb9r9C9MMYMYQREz1Z9QsLL4QNoW78fXg9t1EJFZbGrBnkm69Tleznw2VpkY1ItEUYieoDxCDaw=s0-d "d\cos x = -\sin x")
![[;d\tan x=\sec ^2 x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vuhR3dpEpzNXTmHp35RVhS48qCerXbiJQjjdHEE7fXdgnQSRiaopAwPUDW07LZ96b1kbc75aYcXb27ennfel0m9jXJ8QTrI53TMb_X-dtR3GGTkqkQJYKqDEbngA=s0-d "d\tan x=\sec ^2 x")
![[;d \sec x = \tan x \cdot \sec x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_t2C4G42Cv3Bbht2te2MlMKsF4HZaTzGcPFxU92s5KV19PGXTrc9Um-GFuVwjJENxczOXjan_hj-j9cVe9_XoviDcXgnGWgRo_N_IOuZXkzlPPamKP6sd7CMQLJN8Vfr_tsg98zodMelySn9Q=s0-d "d \sec x = \tan x \cdot \sec x")
![[;d \arcsin x =\frac 1 {\sqrt {1-x^2}};]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_sxn6ShhW24RX9rAjcnJc3SQm2k_kouc96Z1i1pY2MqE90VVGRg4uTc4HFrZWh8lpqaY5YOtrwE8KAt9Vs4z0Pm-iG1zmdN93TYG3gowN-G-G3qLLkBSdhlMtGLCaSwG15BFvHo9RlZk_3H5xv_xpmhqSJzdaY7WSf6=s0-d "d \arcsin x =\frac 1 {\sqrt {1-x^2}}")
![[;d \arccos x=-\frac 1 {\sqrt {1-x^2}};]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_uYC7twXwfX1omi5gO4cqQuJEvrJPdX2lTKWPOfVkvfYzAAQ74ezLpoLR16kwOsr7clcYFr7KWxjXauiRI1QG4HaHAL-hhP-h4LsphnTECJ9Tyjcls73jkvW75PbzfAJ_r68l5m-V40lm4BBg3g137OYEn3dCSP5un4=s0-d "d \arccos x=-\frac 1 {\sqrt {1-x^2}}")
![[;d \arctan x= \frac 1 {1+x^2};]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_t9GlYAVZpl-GFAgUk_QQsw-blw-khKG-vqKDtrtgvew5Ecn_tuBrrfikUak_Q6hZJM19AJ_Hx6ziZ9reYnkY8aCi3YwPVaCy5yOcrbOdAxzIJ_8zeaiTZIadRrR3AwnwPxIe3CWLyxQtp5bw=s0-d "d \arctan x= \frac 1 {1+x^2}")
, derivada da função constante. Algumas integrais importantes
![[;\int k\cdot dx=kx;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_scK3umx3bGjJ6P3_u85dFnUwQjkLQm3K4t37bLk1_h9qnrdbDBJGlgLLWEUY80PiT2fcbp1Y1a5vKu42k1Wvlc7ZOCJTqMBKe4ldmKahKpkkI85uhP8kZaUMo=s0-d "\int k\cdot dx=kx")
![[;\int e^x dx=e^x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_ta-Rfwp6sz_6jp8EiuGYOsY1pl7dj49sAARSQv6Wpj3IbEUgMKiQHnwngGKavLyXczpDXMFuuIezn317tLDPUZSoro_6m7LQNU79N8hEUcFFCNapzior7V3-w=s0-d "\int e^x dx=e^x")
![[;\int \frac 1 x dx=\ln |x|;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_uo3JIXQc1wAIa1-mZ8_aNDN8HhO-X5luGtcLj2IcsPpSPnLteo-NuZCJTMPqJ_m6Ujb_9AE5bUWoSyzTqKRQNfadN4nK-PFsM2iO6uIxKhr4I-gXKMv0sH_rBuM_EbitaojwIWNYRWkA=s0-d "\int \frac 1 x dx=\ln |x|")
![[;\int x^n dx=\frac {x^{n+1}}{n+1};]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vPIpuWBgfMI-lQpDbkTtH6JuvYZVVJu3kJ2W6fqpJBYaBVm9O0aIr07bdUCDzvf9LAcsC7X89IaYutCCceKOCzdZ4dsaUJO16XDa-R7-6pNVMOw0AH-82JVzc8QZYTI7og5eqsGx3QbZJBNq49p4UjWT7gyrwza2Gr=s0-d "\int x^n dx=\frac {x^{n+1}}{n+1}")
![[;\int \sin x dx=-\cos x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vti0tP_yKso0qGuKFaNDKJRg9R-jzF5e9IZpq-pieBCJntRxBGV8hIDWWY8aWb1AyI1QpUJ7wz_feH0DAeq_jefWUrPI-jdQB8JRJAhcbiDI15jaWo3WYTgOgl90u93V-p=s0-d "\int \sin x dx=-\cos x")
![[;\int \cos x dx=\sin x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_ttD1zHFJwU3fFUYcF3vhlftN6ezirRuH-bJ7W0wU58DtSHIIQ79r_1QWXRxFstWzjZuVOdx4C_Yizg3mXc8B0AZNl45cP7ZdRe-bsNwNjHsOy1sJn2EsonwJF7L65vQ2Q=s0-d "\int \cos x dx=\sin x")
![[;\int \sin ^2 x dx=\frac {2x-\sin 2x}4;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_tyBgqbL-gaY7grFlLfSG6QY7Bxd1LcEjOE5G6d7MeF6ffAVjYvG0i6n1JmUpdHdHbValEaV-C-vpbBMql3N5lXkeI-5W9jXW6QpSyGK23CsJmZiA-CpxmrjVKW1dMBDLcqI9bWC2DSelz32rLxh_lUHnVLl1ZBQXE=s0-d "\int \sin ^2 x dx=\frac {2x-\sin 2x}4")
![[;\int \cos ^2 xdx=\frac {2x+\sin 2x}4;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vRBMWnvk6Y8oEapaRWrDCQ3iu2LmL9qkX9o7DVyP3zM1ZYS4AGoYdya3WKc0zhva6T7KRvUEjxHjIp7yh0O9wt_Fe31F4xEBMiPV-_THecpbn05ecOrlOwDv4P1K3WM_s3e1z7a_asDyw7tDANRrU8QCSB3QTEOQ=s0-d "\int \cos ^2 xdx=\frac {2x+\sin 2x}4")
![[;\int \sec x dx=\ln |\sec x + \tan x|;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_smn2JstXw6kVj8xKiMFMsjaz4aR5A7ycoV9Q-ovCnJwHIuzkbkik5wpuIZFQC3ha10mDUg_SAWzoNJznXcDQhWCTKk8DAQQ3tDRxwF3uIcH5jVjxmY-TkvRH34uinGt4DcdOZpLD7GdOKl5dxAfusbPbhnD8W9WQ=s0-d "\int \sec x dx=\ln |\sec x + \tan x|")
![[;\int \sec ^2 xdx=\tan x;]](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_tbsuQ77WSqi7IbEndw3Y0HsQpZxjS3XJTL3gz5vdS6jLiaFr0BL-pJTznsITsDxZy0MzkiH6K0fM2c2gZFVDU6EnKlWaEWLLY52dHeqDG6q0mZFMPuTyPyDvI8S9TMYtGS01oU=s0-d "\int \sec ^2 xdx=\tan x")
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