A consulting agency reports that only \[30\%\] of a company's website users can successfully use a certain feature of the website. Skeptical of this claim, one of the website developers takes a simple random sample of \[150\] of the company's approximately \[8000\] users and tests whether they can use the feature successfully. The developer finds that \[36\%\] of the sampled users use the feature successfully. Assuming the agency's \[30\%\] claim is correct, what is the approximate probability that more than \[36\%\] of the sample would use the feature successfully? Choose 1 answer: Choose 1 answer: (Choice A) \[P\left(\hat p>0.36\right) \approx 0.01\] A \[P\left(\hat p>0.36\right) \approx 0.01\] (Choice B) \[P\left(\hat p>0.36\right) \approx 0.03\] B \[P\left(\hat p>0.36\right) \approx 0.03\] (Choice C) \[P\left(\hat p>0.36\right) \approx 0.05\] C \[P\left(\hat p>0.36\right) \approx 0.05\] (Choice D) \[P\left(\hat p>0.36\right) \approx 0.07\] D \[P\left(\hat p>0.36\right) \approx 0.07\]