the following table represents the highest educational attainment of all adult residents in a certain town…

the following table represents the highest educational attainment of all adult residents in a certain town. if an adult is chosen randomly from the town, what is the probability that they have a high school degree or some college, but have no college degree? round your answer to the nearest thousandth.\n| | age 20 - 29 | age 30 - 39 | age 40 - 49 | age 50 & over | total |\n|--|--|--|--|--|--|\n| high school only | 1602 | 391 | 329 | 1797 | 4119 |\n| some college | 1989 | 1052 | 829 | 2710 | 6580 |\n| bachelors degree | 1791 | 729 | 424 | 636 | 3580 |\n| masters degree | 1081 | 903 | 527 | 620 | 3131 |\n| total | 6463 | 3075 | 2109 | 5763 | 17410 |

the following table represents the highest educational attainment of all adult residents in a certain town. if an adult is chosen randomly from the town, what is the probability that they have a high school degree or some college, but have no college degree? round your answer to the nearest thousandth.\n| | age 20 - 29 | age 30 - 39 | age 40 - 49 | age 50 & over | total |\n|--|--|--|--|--|--|\n| high school only | 1602 | 391 | 329 | 1797 | 4119 |\n| some college | 1989 | 1052 | 829 | 2710 | 6580 |\n| bachelors degree | 1791 | 729 | 424 | 636 | 3580 |\n| masters degree | 1081 | 903 | 527 | 620 | 3131 |\n| total | 6463 | 3075 | 2109 | 5763 | 17410 |

Answer

Answer:

0.615

Explanation:

Step1: Find number of high - school or some - college

$4119 + 6580=10699$

Step2: Calculate probability

$P=\frac{10699}{17410}\approx0.615$