# Question: Find the geometric mean for the numbers 135 240 1000

Find the geometric mean for the numbers 135, 240, 1000, and 25,000 by following these steps:

a. Find the log (base10) of each number:

135, 240, 1000, 25,000

b. Average those four logs.

c. Find the antilog of the average by raising 10 to the number obtained in part b. The result is the geometric mean. You may round it to the nearest whole number.

d. Find the mean and median of the original four numbers, and then write the values for the geometric mean, the mean, and the median from smallest on the left to largest on the right.

a. Find the log (base10) of each number:

135, 240, 1000, 25,000

b. Average those four logs.

c. Find the antilog of the average by raising 10 to the number obtained in part b. The result is the geometric mean. You may round it to the nearest whole number.

d. Find the mean and median of the original four numbers, and then write the values for the geometric mean, the mean, and the median from smallest on the left to largest on the right.

**View Solution:**## Answer to relevant Questions

a. A hospital employs 346 nurses and 35% of them are male. How many male nurses are there? b. An engineering firm employs 178 engineers and 112 of them are male. What percentage of these engineers are female? c. A large law ...Figure A shows a scatterplot for the U.S. population (in millions) from 1850 to 1900. Figure B shows a residual plot of the same data. Give the reasons why the linear model is not appropriate for predicting the population in ...A random sample of 29 community college students were asked their height in inches and the height of their biological parent of the same gender. The output of a regression analysis for predicting student height from parent ...Figure A shows a scatterplot with the regression line for the ages and weights of a random sample of 19 college baseball players. Figure B gives a prediction (Fit), a prediction interval, and a confidence interval for a new ...Figure A shows a scatterplot for the number of semesters that students have attended a community college and the number of credits they have accumulated. Figure B shows a residual plot of the same data. Is the linear ...Post your question