math21to30 (Math problems ** ) | Church of Jesus Christ Facts

Mathematical problems — Problems 21 to 30

The ten problems are presented first, followed by the solutions to the ten problems.

Problem 21:

Mary travels 30 miles to work. She found that if she increases her normal speed by 10 mph, she arrives 6 minutes earlier to work. What is her normal speed?

Problem 22:

Three positive integers exist such that c² – a² – b² = 101 and a • b = 72. What is the value of a + b + c ?

Problem 23:

If 86 in base 10 is represented by 321 in base x, what does 123 in base x equal in base 10?

Problem 24:

The square of a given number is 6 more than 5 times the number. What is the number?

Problem 25:

The ‘ones’ digit of a 2 digit number is 4 less than the ‘tens’ digit. Dividing the number by the sum of the digits yields 7. What is the number?

Problem 26:

Divide 30 by half and add 10. What is the answer?

Problem 27:

If you take 12 apples from a pile of 20 apples, how many apples do you have?

Problem 28:

Twelve years from now, Ralph will be 4 times as old as he was 15 years ago. How old is Ralph now?

Problem 29:

If Tom is twice as old as Dick was 10 years ago, and if the sum of their ages 5 years ago was 90, how old is Tom now?

Problem 30:

Three times a certain positive integer is one less than the square of another positive integer. The difference of the square of these two integers equals 9. What are the integers?

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Solution to Problem 21:

r = rate or speed, t = time
r₁ x t₁ = 30 miles, r₂ x t₂ = 30 miles, r₁ x t₁ = r₂ x t₂
r₂ = r₁ + 10, t₂ = t₁ – 6 min = t₁ – 1/10 hour
So, r₁ x t₁ = (r₁ + 10) ( t₁ – 1/10 )
rt = rt – r/10 +10t – 1
10t – r/10 = 1, or 100t – r = 10
Since rt = 30, then t = 30/r
Thus, 100 (30/r) – r = 10
(3000/r) – r = 10
3000 – r² = 10r
r² + 10r – 3000 = 0
(r + 60) (r – 50) = 0
r = 50 mph

Solution to Problem 22:

With three unknowns and only 2 equations, this problem cannot be solved mathematically, but it can be solved intuitively.
With a and b as integers, there are only 6 combinations where a • b = 72 ( 1 • 72, 2 • 36, 3 • 24, 4 • 18, 6 • 12, and 8 • 9 ).
With c² = a² + b² + 101, we only need to find the a – b pair which forms an integer square root with 101.
Only the pairing of 4 and 18 works ( 212 = 42 + 182 + 101), or 441 = 441 .
Thus, a + b + c = 4 + 18 + 21 = 43

Solution to Problem 23:

1 (x⁰) + 2 (x¹) + 3 (x²) = 86
3x² + 2x + 1 = 0
(3x + 17)(x – 5) = 0
x = 5
3(5⁰) + 2(5¹) + 1(5²) = y
3 + 10 + 25 = 38, so 123 in base 5 equals 38 in base 10

Solution to Problem 24:

Thus, x² – 6 = 5x
This yields a quadratic equation: x2 – 5x – 6 + 0
Factoring yields (x – 6)(x + 1) = 0
Hence, the number is 6. [Note: -1 is also a correct response]

Solution to Problem 25:

xy equals the number, with x = the ‘tens’ digit and y = the ‘ones’ digit
x = y + 4 and (10x + y) / (x + y) = 7
Simplifying the second equation yields: 10x + y = 7x +7y
Thus, 3x = 6y
Substituting y + 4 for x yields 3(y + 4) = 6y
So, 3y + 12 = 6y
So, y = 4
Hence, the original number must be 84

Solution to Problem 26:

Did I trick you? Notice that the problem says ‘by half’, not ‘in half’. Dividing 30 by half yields 60, not 15. The correct answer is 70.

Solution to Problem 27:

Did I ‘get’ you again? If YOU take 12 apples from a pile, no matter how many apples are in the pile, YOU have 12 apples! Did you say 8?

Solution to Problem 28:

R = Ralph’s current age
R + 12 = 4 (R-15)
R + 12 = 4R – 60
3R = 72
R = 24, so Ralph is presently 24 years old.

Solution to Problem 29:

T = Tom’s age now; D = Dick’s age now
T = 2(D – 10) and (T – 5) + (D – 5) = 90
Substituting yields: ((2(D – 10)) – 5) + (D – 5) = 90
So, 2D – 20 – 5 + D – 5 = 90
3D – 30 = 90, so 3D = 120, and D = 40
So, T = 2(40 – 10), or T = 60
Tom is 60 and Dick is 40

Solution to Problem 30:

From the first statement: 3x + 1 = y²
From the second statement: x² – y² = 9
Substituting from the 1st statement into the 2nd statement yields: x² – (3x + 1) = 9
Thus, x² – 3x – 1 = 9
So, x² – 3x – 10 = 0
Factoring yields (x – 5)(x + 2) = 0
So x = 5
If x = 5, then y = 4

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