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Question: If ex = 7, then x =?
Solution:
Given,
ex = 7
⇒ ln(ex) = ln 7
∴ x = ln 7; [Formula: ln(ex) = x]
PrepBank · বিষয়ভিত্তিক প্রশ্ন
PrepBank · পাতা ৩ / ৫ · ২০১–৩০০ / ৪৭১
Question: If ex = 7, then x =?
Solution:
Given,
ex = 7
⇒ ln(ex) = ln 7
∴ x = ln 7; [Formula: ln(ex) = x]
3 coaches and 3 batsman or 2 bowlers and 4 coaches means
(3 coaches x 3 batsman) + (2 bowlers x 4 coaches)
Select 3 coaches out of 5 = 5C3 = 5!/(3! × 2!) = 10
Select 3 batsman out of 4 = 4C3 = 4!/(3! × 1!) = 4
Select 2 bowlers out of 3 = 3C2 = 3!/(2! × 1!) = 3
Select 4 coaches out of 5 = 5C4 = 5!/(4! × 1!) = 5
Total ways to form the group = (10 × 4) + (3 × 5) = 40 + 15 = 55.
Question:
Solution:
(34x17y18)1/4
= (34/4x17/4y18/4)
= 3x17/4y9/2
Question: If a and b are whole numbers such that, ab = 32; the value of (a + 1)2b - 7 is-
Solution:
Here, ab = 32
ab = 25
∴ a = 2 and b = 5
Now,
(2 + 1)(2 × 5) - 7 = 3(10 -7)
= 33
= 27
Given, (1/5)3y = 0.008 = 8/1000
Or, (1/5)3y = 1/125 = (1/5)3
Or, 3y = 3
Or, y = 1
So, (0.25)y = (0.25)1 = 0.25
Question: If ax = by, then:
Solution:
ax = by
⇒ log ax = log by
⇒ x log a = y log b
⇒ (log a)/ (log b) = y/x
Question:
Solution:
Question: If x = 101.4, y = 100.7 and xz = y3, then what is the value of z?
Solution:
Given,
x = 101.4, y = 100.7
Now,
xz = y3
⇒ (101.4)z = (100.7)3
⇒ 101.4z = 102.1
⇒ 1.4z = 2.1
⇒ z = 2.1/1.4
⇒ z = (2.1 × 10)/(1.4 × 10)
⇒ z = 21/14
∴ z = 3/2
Question: Which of the following statements is not correct?
Solution:
Option ক)
Since logaa = 1
So, log1010 = 1
This is correct.
Option খ)
log(2 + 3) = log(2 × 3)
Compute the left side- 2 + 3 = 5, so log(2 + 3) = log5.
Compute the right side- 2 × 3 = 6, so log(2 × 3) = log6.
Logarithm property: log(a⋅b) = loga + logb, not log(a + b).
This is incorrect.
Option গ)
Since loga1 = 0, so log101 = 0.
This is correct.
Option ঘ)
log (1 + 2 + 3) = log 1 + log 2 + log 3
Compute the left side- 1 + 2 + 3 = 6, so log(1 + 2 + 3) = log6.
Right side- log1 + log2 + log3 = log(1 × 2 × 3) = log6
Both sides are equal: log6 = log6
This is correct.
Option খ) is the only statement that is not correct.
প্রশ্ন: প্রদত্ত
সমাধান:
Question: If a and b are positive real numbers, then (a0 - 3b0)5 = ?
Solution:
We know that for any positive real number,
a0 = 1 and b0 = 1
So, (a0 - 3b0)5
= (1 - 3 × 1)5
= (1 - 3)5
= (- 2)5
= - 32
Question: If 3x + 3 + 7 = 250, then x is equal to?
Solution:
Given that,
3x + 3 + 7 = 250
⇒ 3x + 3 = 250 - 7
⇒ 3x + 3 = 243
⇒ 3x + 3 = 35
⇒ x + 3 = 5
⇒ x = 5 - 3
∴ x = 2
So the value of x is 2
প্রশ্ন: If logx(81/16) = - 2, then x = ?
সমাধান:
দেওয়া আছে,
logx(81/16) = - 2
⇒ x- 2 = 81/16
⇒ x- 2 = (9/4)2
⇒ x-2 = (9/4)2
⇒ x- 2 = 1/(4/9)2
⇒ x- 2 = (4/9)- 2
∴ x = 4/9
Question: If P = 216- 1/3 + 243- 2/5 + 256- 1/4, then which one of the following is an integer?
Solution:
P = 216- 1/3 + 243- 2/5 + 256- 1/4
= (63)- 1/3 + (35)- 2/5 + (44)- 1/4
= 63(- 1/3) + 35(- 2/5) + 44(- 1/4)
= 6- 1+ 3- 2+ 4- 1
= (1/6)+ (1/9) + (1/4)
= (6 + 4 + 9)/36
∴ P = 19/36
Now,
Option (A): P/19 = (19/36)/19 = 1/36, not an integer. Reject.
Option (B): P/36 = (19/36)/36 = 19/362, not an integer. Reject.
Option (C): 36/P = 36/(19/36) = 362/19, not an integer. Reject.
Option (D): 19/P = 19/(19/36) = 36, an integer. Correct.
Option (E): P = 19/36, not an integer. Reject.
Question: If logm (1/√32) = - 5/2 what is the value of m?
সমাধান:
দেওয়া আছে,
logm (1/√32) = - 5/2
⇒ m- 5/2 = 1/√32 [logaM = x হলে, ax = M হয়]
⇒ m- 5/2 = 1/(321/2)
⇒ m- 5/2 = 32- 1/2
⇒ m- 5/2 = (25)- 1/2
⇒ m- 5/2 = 2- 5/2
∴ m = 2
Question: If 9x + y = 1 and 9x - y = 3, then what are the values of x and y respectively?
Solution:
Given,
9x+y = 1
⇒ 9x + y = 90
⇒ x + y = 0 .......(1)|
Again,
9x - y = 3
⇒ 9x - y = 31
⇒ (32)x - y = 31
⇒ 32(x - y) = 31
⇒ 2(x - y) = 1
⇒ x - y = 1/2 .............(2)
Now, solving (1) and (2) we get,
x + y = 0
x - y = 1/2
⇒ 2x = 1/2
∴ x = 1/4
Now,
x + y = 0
⇒ 1/4 + y = 0
⇒ y = - 1/4
Question: If logy81 = 4/2, what is the value of y?
Solution:
logy81 = 4/2
⇒ logy81 = 2
⇒ y2 = 81 [logba = c ⇒ bc = a]
⇒ y2 = 92
∴ y = 9
Question: If 4a = 5, 5b = 6, 6c = 7, 7d = 8, then the value of abcd is = ?
Solution:
8 = 7d
= (6c)d
= 6cd
= (5b)cd
= 5bcd
= (4a)bcd
= 4abcd
⇒ 4abcd = 8
⇒ (22)abcd = 23
⇒ 2abcd = 3
∴ abcd = 3/2
(10)200÷(10)196
=(10)200−196
= 104
=10000
Question: 4 log 2 + log 7 =?
Solution:
4 log 2 + log 7
= log 24 + log 7
= log 16 + log 7
= log (16 × 7)
= log 112
Question: If logxy = 100 and log3x = 20; then the value of y is-
Solution:
Given,
log3x = 20
∴ x = 320
And, logxy = 100
⇒ y = x100
⇒ y = (320)100
∴ y = 32000
3x + 3x + 3x
= 3.3x
= 31.3x
= 3x + 1
Let x=log27
=> 2x=7
which is only possible for irrational number
Question: If x and y are positive real numbers, then (2x0 - 5y0)3 = ?
Solution:
We know that for any positive real number,
x0 = 1 and y0 = 1
So, (2x0 - 5y0)3
= (2 × 1 - 5 × 1)3
= (2 - 5)3
= (- 3)3
= - 27
3log2+2log3
=log23+log32
=log8+log9
=log(8×9)
=log72
2log6+log2
=log62+log2
=log36+log2
=log72
3log2+2log3 / 2log6+log2
=log72 / log72
= 1
Question: Find the value of n, if 9n - 1 = 243.
Solution:
9n - 1 = 243
⇒ (32)n - 1 = 35
⇒ 32(n - 1) = 35
⇒ 32n - 2 = 35
⇒ 2n - 2 = 5
⇒ 2n = 5 + 2
⇒ 2n = 7
⇒ n = 7/2
⇒ n = 3.5
Question: If logx 1/216 = - 3, then x = ?
Solution:
Given that,
logx 1/216 = - 3
⇒ x- 3 = 1/216
⇒ 1/x3 = 1/216
⇒ x3 = 216
⇒ x3 = 63
∴ x = 6
Question: Solve for x: log2(x + 5) = 3.
Solution:
Given,
log2(x + 5) = 3
⇒ x + 5 = 23 [logax = b ⇒ x = ab]
⇒ x + 5 = 8
⇒ x = 8 - 5
∴ x = 3
Question:
Solution:
Question: (1/2)(logx + logy) will equal to log{(x + y)/2} if -
Solution:
(1/2)(logx + logy) = log{(x + y)/2}
⇒ (1/2)log(xy) = log{(x + y)/2}
⇒ log(xy)1/2 = log{(x + y)/2}
⇒ (xy)1/2 = (x + y)/2
⇒ xy = {(x + y)/2}2
⇒ 4xy = x2 + y2 + 2xy
⇒ x2 + y2 - 2xy = 0
⇒ (x - y)2 = 0
⇒ x - y = 0
∴ x = y