Mathematics Knowledge – Test 3

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First you need to get common denominators

1/9 + 11/81 + 16/27 + x/? = ?/? or 100 %

9/81 + 11/81 + 48/81 + x/81 = 81/81

68/81 + x/81 = 81/81

x/81 = 81/81 - 68/81

x/81 = 13/81

13/81 is the inheritance of the 4th child.

Using the segment addition postulate, RS+ST=RT you can add the first two equations together and set them equal to the third. then just solve for y.

8y+4

4y+8

12y+12=15y-9

12=3y-9

21=3y

7=y

(a) 0.5 x base x height equals area. We know the area is 110 and the base is 14. So : 0.5 x 14 x height = 110. Solve for height, you get 110/7.

(b) Consider a line from the top of the triangle to the base. That line forms a right triangle. I know one leg of the right triangle is 7 (half the base) and I know the other leg is 110/7 (from part a).

(c) use the pythagorean theorem to determine the length of a side: sqrt((7)^2 + (110/7)^2) = 17.2

Trip one: (50 mph)( 6.5 hrs) = 325 miles

(325miles)($0.30 per mile) = $97.50

Trip two: (55mph)(6.0 hrs) = 330 miles

(330 miles)($0.30 per mile) = $99.00

Trip two cost more by ($99.00 - $97.50) = $1.50

Rewrite Problem

X/4 - X/7 = 3

Multiply each side by 7, then by 4

7X - 4X = 84

Subtract

3X = 84

Divide by 3

X = 28

Write what you know.

Variables:

a = first isosceles leg

b = second isosceles leg

c = base

Given: perimeter 345 cm

Means: a + b + c = 345

Given: base length 85

Means: c = 85

Implied: You know that the non-base legs have the same lenght.

Means: a = b

You have 3 equations.

a + b + c = 345

c = 85

a = b

Substitute c with 85 and a with b in the first equation.

a + b + c = 345

b + b + 85 = 345

2b + 85 = 345

2b = 345 - 85

2b = 260

b = 260 / 2

b = 130

Since a = b, a is also 130.

ANSWER: Each leg is 130 cm. The base is 85 cm (given).

5-6x<7

-5+(5-6x)<7-5 subtract 5 from both sides to get rid of the 5 on the left

(-6x)/6<2/6 divide each side by six

-x<(1/3) here is the tricky part when ever you divide and ineqaulity by a negative number you always flip the inequality (> becomes <)

Answer: x>(-1/3) x is less than negative one third

35 men makes 20% so 35/.2 gives the number of people in the room, so that makes 175 people. 80% of that is 140 women.

You're multiplying 8.20 times 8 1/2.

Since you're going to end up with a money answer, change the fraction 8 1/2 to 8.5. Set up the problem with 8.2 on top and 8.5 on the bottom. Work it as a 2-digit multiplication problem, but when you get to your answer, don't forget where to put the decimal. Count 2 decimal digits in the problem (2, 0 and 5) and count over 2 places from the right.

$69.70.

A + B = 224

B + C = 209

A + C = 200

B = 209 - C

A + (209 - C) = 224

A = 15 + C

15 + C + C = 200

2C = 185

C = 92.5 lbs

B + 92.5 = 209

B = 116.5

8/20=30/x

..8.......30

----- = -------- we cross multiply

.20.......x

8x=600 divide both sides by 8

x=75

In hours:

= 2/3(1 1/4)

= 2/3(5/4)

= 10/12 or 5/6

In minutes:

= 60(5/6)

= 300/6 or 50

Answer: 5/6 hour OR 50 minutes

This is a linear equation. In order to graph it, "y" must be on one side of the equation by itself. The equation for a linear equation is y=mx+b, where m is the slope and b is the y-intercept. So the number next to "x" after you solve the equation for "y" is the slope of the line. Here are the steps on how to do this:

1. First you have to solve for "y" so rearrange the equation so that it says y=5x-7/2.

a) To do this, first subtract 7 from each side, making the equation look like this--> 2y=10x-7.

b)Then divide each term by 2 on each side, changing the equation to y=5x-7/2. (2y divided by 2 =y)(10x divided by 2 =5x) and (-7 divided by 2 =-7/2)

2.Since the equation for linear equations is y=mx+b, the slope of the linear equation is 5. This is because 5 is the number being multiplied by "x". The -7/2 is the y-intercept, but you don't need to know that.

Here it's laid out so it's simpler to visualize:

2y+7=10x

2y+7-7=10x-7

2y=10x-7

2y/2=(10x-7)/2 (/ is division)

y=5x-7/2 (don't simplify -7/2 because it makes the equation harder if you need to graph it.

Slope=5

The first half of the problem:

[(1/3)(1/4)]

When you multiply fractions, you multiply the two numerators (the numbers on the top of the fractions) and you multiply the two denominators (the numbers on the bottom of the fractions).

So,

1/3 times 1/4 =

1x1 / 3x4 =

1/12

And the second half of the problem:

[(1/6)/(8/3)]

Now, when you DIVIDE BY a fraction, you can flip the fraction you are dividing by (in this case, the fraction you are dividing by is 8/3) and multiply it to the first fraction.

So,

(1/6) divided by (8/3) is the same thing as

(1/6) times (3/8)

And what is (1/6) x (3/8)? it's going to be:

(1 times 3) divided by (6 times 8).

which equals:

3/48

Alright, so now you need to add (1/12) + (3/48). To do this, we need to find a common denominator. In other words, a common denominator is a number that is a multiple of all the denominators of a set of fractions. We're trying to get all the denominators to be the same number before we add.

The lowest common denominator of 12 and 48 is 48, since 12 times 4 = 48. So we can leave the 3/48 alone, but we need to change the 1/12.

When we change fractions, all we can do is multiply both the numerator and denominator by the same number. So our new fraction will reduce to the same fraction as before, the same way 6/3 = 2/1. If you multiply 2 by 3 and multiply 1 by 3, you get 6 and 3.

So, since 12 times 4 = 48, we can multiply both the numerator and denominator of 1/12 by 4.

So, 1/12 = (1 x 4) / (12 x 4) = 4/48

Does 4/48 still equal 1/12? Yes.

Now we can finally add the two numbers.

4/48 + 3/48 =

7/48

And 7/48 is your final answer.