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25 September, 09:31

Would it make sense to use this model to predict the age difference between husband/wife in a country where the literacy rate is 8 %?

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  1. 25 September, 11:55
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    The question is incomplete because it was unable to give direction on what action to take. However, kindly find the complete question below.

    Question:

    Is there a relation between the age difference between husband/wives and the percent of a country that is literate. Researchers found the least - squares regression between age difference (husband age minus wife age), y, and literacy rate (percent of the population that is literate), x, is y^=-0.0527x+7.1. The model applied for 18≤x≤100. (a) Interpret the slope. (b) Does it make sense to interpret they-intercept? Explain. (c) Predict the age difference between husband/wife in a country where the literacy rate is 25 percent. (d) Would it make sense to use this model to predict the age difference between husband/wife in a country where the literacy rate is 10 percent? Explain. (e) The literacy rate in the United States is 99 percent and the age difference between husbands and wives is 2 years. Is this age difference above or below the average age difference among all countries whose literacy rate is 99 percent?

    Step-by-step explanation:

    Given the model

    : y^ = - 0. 0527x + 7.1

    (a) The slope represents the average increase (decrease) in y per unit of x.

    The age difference between husband and wife decreases by 0.0527 years per percentage (%) of literacy rate.

    (b) It does not make sense to interpret the y intercept, because the literacy rate of 0 % is not in the given range of literacy rates (18 ≤ x ≤ 100) and the pattern between the variables could change outside of the given range of x - axis.

    (c) Replace x in the given equation by 25 and evaluate:

    we then have: y^ = - 0. 0527 (25) + 7.1 = 5.7825

    Thus, the predicted age difference is 5.7825 years.

    (d) It does not make sense to make a prediction for 10% literacy rate because the literacy rate of 10% is not in the given range of literacy rates

    (18 ≤ x ≤ 100) and the pattern between the variables could change outside of the given range of x - values

    (e) Replace x in the given equation by 99 and we calculate thus

    y^ = - 0. 0527 (99) + 7.1 = 1.8827

    Hence, the average age difference is 1.8827 years and 2 years is then above the average age difference.

    So the answers are:

    (a) The average difference between husband and wife decrease by 0.0527 years per % of literacy rate

    (b) No

    (c) 5.7825 years

    (d) No

    (e) Above
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