Problem

Find the $z$-score for which $70 \%$ of the distribution's area lies to its righ

Answer

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Answer

Final Answer: The z-score for which 70% of the distribution's area lies to its right is approximately \(\boxed{-0.524}\).

Steps

Step 1 :The z-score is a measure of how many standard deviations an element is from the mean. To find the z-score for which 70% of the distribution's area lies to its right, we need to find the z-score for which 30% of the distribution's area lies to its left, because the total area under the curve of a normal distribution is 1 or 100%.

Step 2 :The z-score is calculated to be approximately -0.5244005127080407.

Step 3 :Final Answer: The z-score for which 70% of the distribution's area lies to its right is approximately \(\boxed{-0.524}\).

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