Algebra 1 Equations Needed in 1.5 hours!
Online Homework System Assignment Worksheet
1/12/14 - 6:43 PM
Name: ____________________________ Class: Post University - College Algebra
(MAT120.37, MOD 3) (1qaq3b2)
Class #: ____________________________ Section #: ____________________________
Instructor:Maple T.A. Administrator Assignment:Unit 1 Exam
Question 1: (1 point)
Solve.
11w−10=8w−8
w= ____________
Question 2: (1 point)
Solve.
11(11−t)+3=−3(t−3)−4
If the answer is not an integer, enter it as a fraction.
If there is no solution, enter “none”.
If all real numbers are solutions, enter "all".
t= ____________
Question 3: (1 point)
Solve.
10−9x3=3(x+2)4
If the answer is not an integer, enter it as a fraction.
If there is no solution, enter “none”.
If all real numbers are solutions, enter "all".
x= ____________
Question 4: (1 point)
Solve.
3−w3=3(w+2)4
If the answer is not an integer, enter it as a fraction.
If there is no solution, enter “none”.
If all real numbers are solutions, enter "all".
w= ____________
Question 5: (1 point)
Solve.
−36t+5=56t−3
If there is no solution, enter “no solution”.
t= ____________
Question 6: (1 point)
Solve.
−4w10w−6+3=610w−6
If there is no solution, enter “no solution”.
w= ____________
Question 7: (1 point)
Solve for x.
− 3t+3x=10
x= __________
Question 8: (1 point)
Solve for t.
2−s=4tj+5
If the expression for t is a rational expression, enter it as a single term in simplest form. For example, if the expression
is 3t−g,enter 3−gtt.
t=__________
Question 9: (1 point)
Solve for z.
x=y37− z
Enter the expression in simplest form.
z=
Question 10: (1 point)
Sophie earns a salary of $600per month for working 4hours a day. In May, Sophie worked additional hours at $16per
hour and earned $664for the month.
Write an equation to model this situation where tis the number of additional hours she worked in May.
__________
Find the number of additional hours she worked in May.
Additional hours = ____________
Question 11: (1 point)
A student's grade in a course is the average of 4 test grades and a final exam that is worth twice as much as each test.
Suppose a student has test grades of 90, 88, 88, and 92. Write an equation to model this situation where xis the
student's grade on the final exam and yis the student's average for the course.
__________
Then find the score they will need to receive on their final exam if they want to have a grade of 90 for the course.
Final exam score needed = ____________
Question 12: (1 point)
Suppose your average, after taking 3 quizzes, is 72 (out of 100). What must your average be on the next 5 quizzes to
increase your average to 77 out of 100?
Required average = ____________
Question 13: (1 point)
The product of two consecutive integers is 7less than the square of the smaller integer. Find the larger of the two
integers.
The larger of the two integers is ____________.
Question 14: (1 point)
Find the largest of three consecutive odd integers whose sum is 225.
The largest of the three integers is ____________.
Question 15: (1 point)
A clock is marked 12%off and the sale price is $38.72.What was the original price?
Original price: $ ____________
Question 16: (1 point)
Kelly earns 20% more than Cici, and together they earn $1155.00per week. How much does Kelly earn per week?
If the answer is not an integer, enter it as a decimal. Round to the nearest hundredth, if needed.
Kelly earns $ ____________each week.
Question 17: (1 point)
Douglas invests money in two simple interest accounts. He invests twice as much in an account paying 13% as he
does in an account paying 6%. If he earns $112.00 in interest in one year from both accounts combined, how much did
he invest altogether?
Total Principal in Both Accounts = $ ____________
Question 18: (1 point)
A cone has volume V=13πr2h,where ris the radius of the cone's base and his the height of the cone. Find the height in
centimeters of a cone with volume 108π cm3and radius 6centimeters.
Height of cone: ____________ centimeters
Question 19: (1 point)
A 10-foot tree casts a 12-foot shadow. At the same time, a nearby cell tower casts a 60-foot shadow. How tall (in feet)
is the cell tower?
Height of cell tower: ____________feet
Question 20: (1 point)
Amy drove from Denver to Cheyenne during rush hour at an average speed of 60miles per hour, and then drove back the
same way at an average speed of 40miles per hour.
If the round trip took 4 hour and 15 minutes, how many miles is Amy's one-way trip from Cheyenne to Denver?
If the answer is not an integer, enter it as an exact decimal.
____________miles
Question 21: (1 point)
Express commuter train #12 leaves the downtown station and travels at an average speed of 50miles per hour towards
the north side station, which is48.75miles away. Thirty minutes later, express commuter train #7 leaves the north side
station and travels at an average speed of 45miles per hour towards the downtown station.
At the moment when the two trains pass each other, how far (in miles) is the #12 train from the downtown station and
how long (in minutes) has the #12 train have been traveling?
If the answer is not an integer, enter it as an exact decimal.
#12 train is ____________ miles from the downtown station and has been traveling for ____________ minutes.
Question 22: (1 point)
Two pumps can fill a water tank in 220minutes when working together. Alone, the second pump takes 5times as long as
the first to fill the tank.
How many minutes would it take the first pump to fill the tank?
It will take ____________ minutes for the first pump to fill the tank.