Đề kiểm tra 1 tiết thử chương III: Nguyên hàm, tích phân ứng dụng-Đề 6

\((\int {f(x)\;dx} )' = f(x),\;\forall x \in K.\)

\(\int {F(x)dx = f(x) + C,\;C \in K.} \)

\((F(x))' = f(x),\;\forall x \in K.\)

\(\int {f(x)dx = F(x) + C,\;C \in K.} \)

\(m \ge 2.\)

\(m \ge 1.\)

\(m \ge 3.\)

\(m \ge 0.\)

Bước 2.

Bước 1.

Bước 4.

Bước 3.

\(I = 21\;m.\)

\(I = 16\;m.\)

\(I = 15\;m.\)

\(I = 10\;m.\)

\(\int\limits_1^6 {f(x)\;dx = - 12.} \)

\(\int\limits_1^6 {f(x)\;dx = - 2.} \)

\(\int\limits_1^6 {f(x)\;dx = 12.} \)

\(\int\limits_1^6 {f(x)\;dx = 2.} \)

\(I = 0.\)

\(I = 2.\)

\(I = 1.\)

\(I = 3.\)

\(V = \int_a^b {{{\left( {f(x)} \right)}^2}dx.} \)

\(V = \pi \int_a^b {{{\left( {f(x)} \right)}^2}dx.} \)

\(V = \pi \int_a^b f \left( x \right)dx.\)

\(V = \int_a^b {\left| {f\left( x \right)} \right|} dx.\)

\(I = \frac{7}{2}.\)

\(I = \pi .\)

\(I = - 4.\)

\(I = 0.\)

\(F(x) = {3^x} - {e^x} + C,\;C \in R.\)

\(F(x) = \frac{{{3^x}}}{{\ln 3}} - \frac{{{{(\frac{e}{3})}^x}}}{{\ln \frac{e}{3}}} + C,\;C \in R.\)

\(F(x) = {3^x}\ln 3 - {e^x} + C,\;C \in R.\)

\(F(x) = \frac{{{3^x}}}{{\ln 3}} - {e^x} + C,\;C \in R.\)

\(I = \int\limits_0^2 {\frac{{2{t^2}}}{3}\;dt.} \)

\(I = \int\limits_1^3 {{t^3}\;dt.} \)

\(I = \int\limits_1^3 {\frac{t}{3}\;dt.} \)

\(I = \int\limits_1^3 {\frac{{2{t^2}}}{3}\;dt.} \)

\( S= \int\limits_a^b {\left| {{f_1}\left( x \right) - {f_2}\left( x \right)} \right|dx} .\)

\(S = \int\limits_a^b {\left[ {\left| {{f_1}\left( x \right)} \right| - \left| {{f_2}\left( x \right)} \right|} \right]dx} .\)

\(S = \int\limits_a^b {{f_1}\left( x \right)dx} - \int\limits_a^b {{f_2}\left( x \right)dx} .\)

\(S = \int\limits_a^b {\left[ {{f_1}\left( x \right) - {f_2}\left( x \right)} \right]dx} .\)

\(F(x) = x + \ln \left| {2x - 1} \right| - 1.\)

\(F(x) = \frac{1}{2}\ln \left| {2x - 1} \right| - 1.\)

\(F(x) = x + \frac{1}{2}\ln \left| {2x - 1} \right| - 1.\)

\(F(x) = x + \frac{1}{2}\ln \left| {2x - 1} \right| + 1.\)

\(\int {{e^x}\;dx = {e^x} + C.} \)

\(\int {{a^x}\;dx = {a^x} + C.} \)

\(\int {{e^{5x}}\;dx = \frac{{{e^{5x}}}}{5} + C.} \)

\(\int {{a^x}\;dx = \frac{{{a^x}}}{{\ln a}} + C.} \)

\(\frac{\pi }{2}\) (đvtt).

\(\frac{\pi }{4}\) (đvtt).

\(\frac{\pi }{8}\) (đvtt).

\(\pi \) (đvtt).

\(F(x) = (x + 1)( - \cos x) - \int {\cos x\;dx} .\)

\(F(x) = (x + 1)( - \cos x) + \int {\cos x\;dx} .\)

\(F(x) = (x + 1)( - \cos x) - \int {\sin x\;dx} .\)

\(F(x) = (x + 1)\sin x + \int {\cos x\;dx} .\)

\(S = 6\) (đvdt).

\(S = 4\) (đvdt).

\(S = 8\) (đvdt).

\(S = 2\) (đvdt).

\(\frac{\pi }{3}\) (đvtt).

\(\frac{\pi }{2}\) (đvtt).

\(\frac{\pi }{6}\) (đvtt).

\(\frac{\pi }{4}\) (đvtt).

\(\int {{x^2}\sqrt {{x^3} + 1} \;dx} = \int {\frac{{2{t^2}}}{3}\;dx.} \)

\(\int {{x^2}\sqrt {{x^3} + 1} \;dx} = \int {\frac{{2{t^2}}}{3}\;dt.} \)

\(\int {{x^2}\sqrt {{x^3} + 1} \;dx} = \int {\frac{t}{3}\;dt.} \)

\(\int {{x^2}\sqrt {{x^3} + 1} \;dx} = \int {{t^3}\;dt.} \)

\(F(x) = \frac{{{{(3x - 1)}^4}}}{4} + C,\;C \in R.\)

\(F(x) = \frac{{{{(3x - 1)}^4}}}{{12}} + C,\;C \in R.\)

\(F(x) = 3{(3x - 1)^2} + C,\;C \in \mathbb{R}.\)

\(F(x) = \frac{{{{(3x - 1)}^4}}}{3} + C,\;C \in R.\)

Bước 3

Bước 1

Bước 2

Bước 4

\(g(x) = - \frac{1}{3}sin3x + x.\)

\(g(x) = 3sin3x.\)

\(g(x) = \frac{1}{3}sin3x + x.\)

\(g(x) = - 3sin3x.\)

\(\int\limits_0^1 {\ln (x + 2)dx = \left. {(x + 2)\ln (x + 2)} \right|} _0^1 - \int\limits_0^1 {1\;dx} .\).

\(\int\limits_0^1 {\ln (x + 2)dx = \left. {(x + 2)\ln (x + 2)} \right|} _0^1 + \int\limits_0^1 {1\;dx} .\).

\(\int\limits_0^1 {\ln (x + 2)dx = \left. {x\ln (x + 2)} \right|} _0^1 - \int\limits_0^1 {\frac{{x + 2}}{x}\;dx} .\) \(S = \int\limits_a^b {\left| {{f_1}\left( x \right) - {f_2}\left( x \right)} \right|dx} .\)

\(\int\limits_0^1 {\ln (x + 2)dx = \left. {\frac{1}{{x + 2}}} \right|} _0^1.\)

\(S = 1\)(đvdt).

\(S = e\) (đvdt).

\(S = e - 1\)(đvdt).

\(S = e + 1\)(đvdt).

\(\int\limits_a^b {f(x)dx = } F(b) - F(a).\)

\(\int\limits_a^b {f(x)dx = } F(a) - F(b).\)

\(\int\limits_a^b {k.f(x)dx = } k\;F(b) - F(a).\)

\(\int\limits_a^b {f(x)dx = } f(b) - f(a).\)

\(\int {f\left( x \right)dx = {x^5} - 3{x^3} + x} + C,\;C \in R.\)

\(\int {f\left( x \right)dx = 4{x^3} - 6x} + C,\;C \in R.\)

\(\int {f\left( x \right)dx = \frac{{{x^5}}}{5} - {x^3}} + C,\;C \in R.\)

\(\int {f\left( x \right)dx = \frac{{{x^5}}}{5} - {x^3} + x} + C,\;C \in R.\)