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Ms. miller decides to give a test worth 90 points and contains 25 questions. multiple-choice questions are worth 3 points and word problems are worth 4 points. how many of each type of question are there?

Respuesta :

Americ
x= # of multiple choice questions
y= # of word problem questions

EQUATION 1:
x + y= 25

EQUATION 2:
3x + 4y= 90


STEP 1:
solve for one variable in equation 1

x + y= 25
subtract y from both sides
x= 25 - y


STEP 2:
substitute x=25-y in equation 2

3x + 4y= 90
3(25-y) + 4y= 90
75 - 3y + 4y= 90
75 + y= 90
subtract 75 from both sides
y= 15 word problems


STEP 3:
substitute y value to find x

x + y= 25
x + 15= 25
x= 10 multiple choice questions


ANSWER: There are 15 word problems and 10 multiple choice questions.

Hope this helps! :)
raphealnwobi

10 multiple-choice questions and 15 word problems in the test.

Let x represent the number of multiple-choice questions and y represent the number of word problems.

Ms. miller decides to give a test worth 90 points and contains 25 questions. hence:

x + y = 25   (1)

Also:

3x + 4y = 90   (2)

Solving equations 1 and 2 simultaneously gives:

x = 10, y = 15

There are 10 multiple-choice questions and 15 word problems in the test.

Find out more at: https://brainly.com/question/21105092

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