Since ( 1/2) is constant with respect to ( u), move ( 1/2) out of the integral. ( 1/2∫ e^udu) The integral of ( e^u) with respect to ( u) is ( e^u). ( 1/2(e^u+C)) Simplify. ( 1/2e^u+C) Replace all occurrences of ( u) with ( 2x). ( 1/2e^(2x)+...
Answer to: Evaluate the integral. A) Integral of e^(2x) x^2 dx. B) Integral from 3 to 4 of (3x + 15)/(2x^2 + 7x + 5) dx. By signing up, you'll get...
Answer to: A) Evaluate the integral: integral of 2x sin^(-1)(x^2) dx. B) Determine the indefinite integral: integral of e^(2x) sin(2x) dx. By...
Find the sum of all integral values of x such that 8x2 + 2x - 55 is a prime number.(A)0(B)1(C)2(D)14(E)51 相关知识点: 试题来源: 解析 (A).We know that 8x2 + 2x - 55 = (4x + 11)(2x - 5) is a prime number if and only if: I: 4x + 11 = 1 and (2x -5) ...
$\int (3x^2-2x+1)dx =3\frac{x^{2+1}}{2+1}-2 \frac{x^{1+1}}{1+1}+x+C$ $=3\frac{x^{3}}{3}-2 \frac{x^{2}}{2}+x+C$ $=x^3-x^2+x+C$ Methods of Integration The simplest basic search might not always be enough to find an essential. We use several techniqu...
Find the Integral integral from natural log of 2 to natural log of 4 of (e^(-x))/( square root of 1-e^(-2x)) with respect to x( (∫ )_((ln)(2))^((ln)(4))(e^(-x))/(√(1-e^(-2x)))dx) 相关知识点: 试题来源: 解析 Simplify the denominator.( (∫ )_((ln)(2)...
Evaluate the integral. A) Integral of cos(2x) dx. B) Integral of (sec x)(sec x + tan x) dx. Evaluate the integral. a) integral \frac{e^{x{e^{2x} + 4e^{x} + 3} dx b) integral 4\frac{1}{(4-x^{2})^{\frac{3}{2} dx ...
a.any function whose derivative is the given function, asx2,x2+ 3,x2–5, etc of2x b.the schema representing all such functions, herex2+k c.the symbolic representation of this as a function of the given function, written ∫f(x)dxwheref(x) is the given function ...
The image scale is 0.75"/lens and the field of view of the instrument has the size of 16.5"x16.5". The raster also contains two extra 2x7 lens arrays to acquire the night-sky spectra whose images are offset by $\\\pm$3' from the center. Optical fibers are used to transform micropu...
Here, we propose and demonstrate a modular holographic display system that allows seamless spatial tiling of multiple coarse integral holographic (CIH) displays called “holobricks”. A holobrick is a self-contained CIH module enclosing a spatial light m