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Understanding the cosine angle subtraction formula is vital for solving certain types of trigonometric problems. At its core, this formula expresses the cosine of the difference between two angles in terms of the cosines and sines of the angles themselves. The generic formula is:

\[ \text{cos}(A - B) = \text{cos} A \times \text{cos} B + \text{sin} A \times \text{sin} B \
\] When applied to an expression like \( \text{cos} \sqrt{x+1} - \text{cos} \sqrt{x} \), one might be tempted to simply subtract the values. However, using the angle subtraction formula allows for greater manipulation and facilitates finding the limit. In the given example, \(A = \sqrt{x+1}\) and \(B = \sqrt{x}\). The aim is to express the initial complex expression in a form that makes it easier to evaluate its limit as \(x\) approaches infinity.

When dealing with limits at infinity, we are essentially interested in the behavior of a function as the input grows without bound. For the cosine function, as with many trigonometric functions, this can be particularly intriguing due to periodicity. However, in some cases, the inside of the cosine function can approach a number as \(x\) goes to infinity.

For instance, the difference \(\sqrt{x+1} - \sqrt{x}\) appears to approach zero as \(x\) becomes very large. By manipulating the expression algebraically, we can show that its limit is indeed zero. This tells us that the entire expression, \(\text{cos}(\sqrt{x+1} - \sqrt{x})\), will approach \(\text{cos}(0)\), which is a known value. By understanding how limits behave at infinity, we can solve limits that may initially seem daunting due to their complex appearance.

Algebraic manipulation is a foundational technique in calculating limits. It involves rewriting expressions in a form that makes taking their limits straightforward. In the step-by-step solution presented, a critical algebraic trick is to rationalize the difference \(\sqrt{x+1} - \sqrt{x}\). By recognizing the form of \(a^2 - b^2 = (a+b)(a-b)\), we can convert the numerator to 1—a constant—and the denominator to a sum of roots that simplifies the expression.

Upon this simplification, the result in the denominator becomes larger as \(x\) increases, making it formidable to deduce that the whole fraction approaches zero. Mastery of these algebraic maneuvers can make a significant difference in solving limits, and is a skill that is essential to the toolkit of anyone tackling calculus problems.