Find the antilogarithm of the given logarithm by using a calculator. 3.778 The antilogarithm is approximately (Round to the nearest whole number as needed.)

To find the antilogarithm of 3.778 using a calculator, you essentially calculate \(10^{3.778}\). When you do that, you’ll find that the antilogarithm is approximately 6010. This means that \(10\) raised to the power of \(3.778\) gives you a value close to 6010, rounding to the nearest whole number. When working with antilogarithms, remember that it’s all about reversing the logarithmic function. It's similar to finding the opposite of a math operation—if you have a logarithm that tells you how many times to multiply the base (in this case, 10) to achieve a certain number, the antilogarithm gets you back to that number!