Evaluate the following integrals. S 5x-2 dx x2-4 s 9x+25 (x+3)2 dx 2 x3+3x2-4x-12 dx x2+x-6
24) Evaluate ſtan 9x dx Click Selecri X o o o -(-) (In | cos 5x1)+c -6(m ) cos ( e “') )+c -(-) ( 11 ) cos 9x [)+c -(1) (Incos (esx))+C 25) Evaluates 5 + 7 sin x 2 sinx Click Here To Select The Answe dx X 5 Inesex - cotx + 7 x + c 5 x + 7 cos x 2 cos x select your answer 5x + 7 con + c 4 cos x...
show the ivp is an exact de and then solve (2xy - 9x^2)dx + (2y + x^2 + 1)dy = 0, y(0) = -3
Evaluate the following integral using integration by parts. ( 164 16x In 9x dx Use the integration by parts formula so that the new integral is simpler than the original one. Choose the correct answer below. O A. 8x In (8x?) - S(9x) di O B. 9x In (9x) S(8x2) OC. 8x? In (9x) – (8x) dx D. 8x In (8x) – (9x) dx
1. Evaluate the indefinite integral sen (2x) – 7 cos(9x) – sec°(3x) dx = 2. Evaluate the indefinite integral | cor(3x) – sec(x) tant(x) + 9 tan(2x) dx = 3. Calculate the indefinite integral using the substitution rule | sec?0 tan*o do =
Solve the equation dx dt = 2 t + 9x xe An implicit solution in the form F(t,x) = C is = C, where is an arbitrary constant. (Type an expression using t and x as the variables.)
Find an integrating factor of the form x"y" and solve the equation. (2x y-9y)dx + (4y -9x)dy 0 by multiplying by the integrating factor. An implicit solution in the form F(x,y) C is C, where C is an arbitrary constant, and (Type an expression using x and y as the variables.) Find an integrating factor of the form x"y" and solve the equation. (2x y-9y)dx + (4y -9x)dy 0 by multiplying by the integrating factor. An implicit solution in the...
f(x)=9x+1/x-1
Solve the given differential equation by separation of variables. dy/dx = sin(9x)
QUESTION 20 Evaluate the definite integral and interpret the result. 23 - 9x) dx O; the shaded area above the x-axis is equal to the shaded area below the x-axis. 9; the shaded area above the x-axis minus the shaded area below the x-axis equals 9. 81; the shaded area above the x-axis plus the shaded area below the x-axis equals 81. 81; the shaded area above the x-axis minus the shaded area below the X-axis equals 81