UPCAT REVIEWER PRACTICE TEST 1
SOLUTION
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION 1. Find the contrapositive of the following statement. “If a figure has three sides, it is a triangle.” (A) If a figure does not have three sides, it is a triangle. (B) If a figure is a triangle, then it does not have three sides (C) If a figure is not a triangle, then it does not have three sides. (D) If a figure has three sides, it is not a triangle. Solution: Recall: The contrapositive of the statement “If p then q” is “If not q then not p” So the contrapositive of “If a figure has three sides, it is a triangle” is “If a figure is not a triangle, then it does not have three sides” Answer: C
2. Solve for x:
x6 x 4
(A) no solution
(B) 100
(C) 5
(D)
25 16
Solution:
x6 x 4
transpose
x6 4 x
get the square of both sides
x to the right
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION x 6 16 8 x x 8 x 10 x x
divide both sides by 8
5 4
get the square of both sides
25 16
Checking:
x6 x 4 25 25 ? 6 4 16 16 25 96 25 ? 4 16 16 121 25 ? 4 16 16 11 5 ? 4 4 4 16 ? 4 4 44 Answer: D
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION 3. Find the length of diagonal AC in the rectangular solid shown. Dimensions are in feet. C
B
2 A (A) 29 d
2
5
d (B) 7 d ft
ft
(C)
29 d 2 ft
(D)
7 d ft
Solution:
C
B
2 A
Using Pythagorean Theorem
d 5 AB 2
2
5
d
A
2
d
AB d 2 25 5
B
Now, we apply the Pythagorean Theorem to ABC
AB 2 BC 2 AC 2
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UPCAT REVIEWER PRACTICE TEST 1
d
2
SOLUTION
25 2 2 AC
AC 2
2
d 2 29
AC d 2 29 Answer: C 2
4. The area of a regular octagon is 30cm . What is the area of a regular octagon with sides four times as large? 2
(A) 545 cm
(B) 480 cm
2
2
(C) 3600 cm
2
(D) 120 cm
Solution: Given: A1 30 cm 2
A2 ? s2 4 s1
s2 4s1 or A2 s2 A1 s1
2
A2 42 A1
A2 16 A1 A2 16 30 A2 480 cm 2 Answer: B
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UPCAT REVIEWER PRACTICE TEST 1
5. Simplify: (A) -4
3 7
3 7
(B) 58
SOLUTION (C) 10
(D) -40
Solution:
3 7
3 7
3 7
2
Recall:
2
a b a b a 2 b 2
37 4 Answer: A
6. If the sum of the roots of x 2 3 x 5 0 is added to the product of its roots, the result is (A) -2
(B) -8
(C) -15
(D) 15
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION Solution:
The roots of ax 2 bx c 0 using quadratic formula are:
Recall:
b b 2 4ac b b 2 4ac and 2a 2a
In the quadratic equation
ax 2 bx c 0 , where a 0
b Sum of roots = a
Sum of roots = Why?
c Product of roots = a
In x 2 3 x 5 0 a=1, b=3, and c=-5 So Sum of roots =
3 = -3 1
5 Product of roots = = -5 1 Sum + Product of roots = (-3) + (-5) = -8 Answer: B
b b 2 4ac b b 2 4ac + 2a 2a
=
2b 2a
=
b a
product of roots =
b b 2 4ac b b 2 4ac 2 a 2 a 2 b b 2 4ac 2a 2
2
b 2 b 2 4ac 2a 2
4ac 4a 2
c a
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION 7. The roots of the equation 2 x 2 x 4 are (A) real, rational, and unequal (B) real and irrational (C) real, rational, and equal (D) imaginary Solution: Express 2 x 2 x 4 in the form ax 2 bx c 0 , and compute the discriminant b 2 4 ac The b2 – 4ac term is called the discriminant and it helps to determine how many and what kind of roots you see in the solution 2
Value of b – 4ac
Is it a perfect square?
Nature of the Roots
b2 – 4ac > 0
yes
2 real roots, rational
b2 – 4ac > 0
no
2 real roots, irrational
b2 – 4ac < 0
not possible
2 imaginary roots
b2 – 4ac = 0
not possible
1 real root
So 2 x 2 x 4 becomes 2 x 2 x 4 0 , a = 2, b = -1, c = -4
b 2 4ac 1 42 4 33 2
The result is 33 which is greater than zero and not a perfect square. therefore the roots are real and irrational. Answer: B
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION 8. Which statement must be true if a parabola represented by the equation y ax bx c does not 2
intersect the x-axis? (A) b 4ac 0, and b 2 4ac is not a perfect square 2
(B) b 4ac 0, and b 2 4ac is a perfect square 2
(C) b 2 4ac 0 (D) b 2 4ac 0
Solution: To get the x-intercept/s of y ax bx c we let y = 0, and solve for x. 2
y ax2 bx c does not intersect the x-axis when the roots of ax 2 bx c 0 are not real or imaginary. That happens when b 2 4ac 0 Answer: C
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION 0 3 9. The value of 2 27 3
1
is
(A) 9
(B)
1 9
(C) 9
(D)
1 9
Solution:
0 3 2 27 3
1
1 2 27 3
1
2
27 3
27
3
2
32
9 Answer: C 5
10. What is the last term in the expansion of x 2 y ? (A) 2 y 5
(B) 32y
5
(C) y
5
(D) 10y
5
Solution: 5
The last term in the expansion of x 2 y is
which is equal to
2 y 5
32 y 5
Answer: B
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION 11. The larger root of the equation x 3x 4 0 is (A) -3
(B) -4
(C) 4
(D) 3
Solution:
x 3x 4 0 x 3 0 or x 4 0 x 3 or x 4
The larger of -3 and 4 is 4. Answer: C
12. Express
(A)
1 1 as a single fraction. x 1 x
2x 3 x2 x
(B)
2x 1 x2 x
(C)
2 2x 1
(D)
3 x2
Solution:
1 1 x x 1 x 1 x xx 1
2x 1 xx 1
2x 1 x2 x
Answer: B
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION 13. Ano ang kabuuan ng walang katapusang geometric series na
3.1 1.86 1.116 0.6696 ... ? (A) 8.75
(B) 9.75
(C) 4.75
(D) 7.75
Solution: Let
x 3.1 1.86 1.116 0.6696 ...
x 3.1 0.6 3.1 1.86 1.116 ... x 3.1 0.6 x
0.4 x 3.1 x
3.1 0.4
x
31 or 7.75 4
We can also use the formula S n
Sn
3 .1 1 0 .6
Sn
3.1 31 7.75 0 .4 4
a1 , where a1 = first term and r = common ratio 1 r
Answer: D
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UPCAT REVIEWER PRACTICE TEST 1
SOLUTION 14. Which equation represents a hyperbola? (A) y 16x 2
(B) y 16 x 2
(D) y
(C) y 2 16 x 2
16 x
Solution: (A) y 16x 2 is a parabola
Recall: The graph of the quadratic function
y ax 2 bx c , where a, b, and c are constants and a 0 , is a parabola that opens upward if a>0, and a parabola that opens downward if a
