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微積分

sin x の積分: 正弦の原始関数

cos x の導関数を逆にたどり、積分定数を加えることで、sin x の積分が -cos x + C になる理由を学びます。

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Problem

Find the integral of sinx\sin x.

Step 1: Start with the meaning

Integration means finding an antiderivative, which is a function whose derivative gives the function we started with. For

sinxdx,\int \sin x\,dx,

the goal is to find a function whose derivative is sinx\sin x.

Step 2: Use a known derivative

A key fact from trigonometric differentiation is

ddx(cosx)=sinx.\frac{d}{dx}(\cos x)=-\sin x.

So cosx\cos x is close, but its derivative has the opposite sign.

Step 3: Adjust the sign

Since cosx\cos x differentiates to sinx-\sin x, multiplying by 1-1 reverses the sign:

ddx(cosx)=sinx.\frac{d}{dx}(-\cos x)=\sin x.

Therefore, cosx-\cos x is an antiderivative of sinx\sin x.

Step 4: Add the constant

Every function that differs from cosx-\cos x by a constant has the same derivative, because the derivative of a constant is 00. Therefore,

sinxdx=cosx+C.\int \sin x\,dx=-\cos x+C.

概念

Antiderivatives and Indefinite Integrals

An antiderivative of f(x)f(x) is a function F(x)F(x) whose derivative is f(x)f(x). The indefinite integral f(x)dx=F(x)+C\int f(x)\,dx = F(x) + C includes an arbitrary constant because many functions share the same derivative.

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