ব্যাখ্যা
Solution:
5-3 + 5-3 + 5-3 + 5-3 + 5-3
= 5.5- 3
= 51 + (- 3)
= 5- 2
PrepBank · বিষয়ভিত্তিক প্রশ্ন
PrepBank · পাতা ৫ / ৫ · ৪০১–৪৬৯ / ৪৭১
Question: If 2x = 3y = 6-z, find the value of (1/x) + (1/y) + (1/z).
Solution:
Let,
2x = 3y = 6-z = k
Now,
2x = k
2 = k1/x ......(1)
Similarly,
3 = k1/y ....(2)
And
6 = k-1/z
⇒ 2 × 3 = k-1/z
⇒ k1/x × k1/y = k-1/z ; [From (1) and (2)]
⇒ k(1/x + 1/y) = k-1/z
⇒ (1/x + 1/y) = - 1/z
∴ 1/x + 1/y + 1/z = 0
Question: If logx (1/√32) = - 5/2 what is the value of x?
সমাধান:
দেওয়া আছে,
logx (1/√32) = - 5/2
⇒ x- 5/2 = 1/√32 [logaM = x হলে, ax = M হয়]
⇒ x- 5/2 = 1/(321/2)
⇒ x- 5/2 = 32- 1/2
⇒ x- 5/2 = (25)- 1/2
⇒ x- 5/2 = 2- 5/2
∴ x = 2
(7a)(7b) = 7c/7d
Or, 7a + b = 7c-d
Or, a + b = c - d
Or, d = c - a - b
Question: If logm(81) = 4, what is the value of m?
Solution:
logm(81) = 4
⇒ m4 = 81 [logb(a) = c ⇒ bc = a]
⇒ m4 = 34
∴ m = 3
Question: 230 + 230 + 230 + 230 = ?
Solution
230 + 230 + 230 + 230
= 4 × 230
= 22 × 230
= 22 + 30
= 232
log104+log1025
= log10(4×25)
= log10100
= log10102
= 2log1010
= 2
Question: If x3 = 125, then x2 + x = ?
Solution:
Given that,
x3 = 125
⇒ x3 = 53
∴ x = 5
Now,
x2 + x = 52 + 5 = 25 + 5 = 30
So the value of x2 + x is 30
Question:
Solution:
Here, ex = 5
⇒ lnex = ln 5
⇒ xlne = ln 5 [As, lne = 1]
∴ x = 1.61
Question:
Solution:
Question: If x and y are positive integers such that 5x + y = 625 and 4x - y = 16, what is the value of x2 - y2?
Solution:
Given that,
5x + y = 625
⇒ 5x + y = 54
∴ x + y = 4 ........(1)
And,
4x - y = 16
⇒ 4x - y = 42
∴ x - y = 2 ....... (2)
Now (1) + (2), we get,
⇒ (x + y) + (x - y) = 4 + 2
⇒ 2x = 6
⇒ x = 6 / 2
∴ x = 3
From (1),
3 + y = 4
⇒ y = 4 - 3
∴ y = 1
∴ x2 - y2 = (3)2 - (1)2
= 9 - 1
= 8
Question: log3(x2 + 3x) - log3(x + 3) = 2, Then what is the value of x?
Solution:
Given that,
log3(x2 + 3x) - log3(x + 3) = 2
⇒ log3[(x2 + 3x)/(x + 3)] = 2 ; [log3A - log3B = log3(A/B)]
⇒ log3[x(x + 3)/(x + 3)] = 2
⇒ log3x = 2
⇒ x = 32
∴ x = 9
Question: Solve for x; logx3 + logx9 + logx27 + logx81 = 10.
Solution:
Given that,
logx3 + logx9 + logx27 + logx81 = 10
⇒ logx(3 × 9 × 27 × 81) = 10
⇒ logx(31 × 32 × 33 × 34) = 10
⇒ logx(310) = 10
⇒ 10 logx3 = 10
⇒ logx3 = 10/10
⇒ logx3 = 1
⇒ x1 = 3
∴ x = 3
Question: Find the value of x if logx 324 = 4.
Solution:
logx324 = 4
⇒ x4 = 324
⇒ (x2)2 = 182
⇒ x2 = 182
⇒ x = √18
⇒ x = √32 × 2
⇒ x = 3√2
By definition x ≠ 1, =1
Given equation can be written as
log(x+1)2 / x2−1=log2
=>x+1 / x−1=2
=>x=3
Question: If 5x + y = 25 and 5x - y = 5, then what are the values of x and y respectively?
Solution:
Given,
5x + y = 25
⇒ 5x + y = 52
⇒ x + y = 2 .......(1)
Again,
5x - y = 5
⇒ 5x - y = 51
⇒ x - y = 1 ........(2)
Now, solving (1) and (2) we get,
x + y + x - y = 2 + 1
⇒ 2x = 3
∴ x = 3/2
Now,
x + y = 2
⇒ 3/2 + y = 2
⇒ y = 2 - (3/2)
⇒ y = 1/2
(x, y) = (3/2, 1/2)
loga10−loga(10/a)
=loga10−[loga10−logaa]
=loga10−loga10+logaa
=0+1=1
Question: Find the value of n, if 27{n - (1/3)} = 243.
Solution:
27{n - (1/3)} = 243
⇒ (33){n - (1/3)} = 35
⇒ 3(3n - 1) = 35
⇒ 3n - 1 = 5
⇒ 3n = 5 + 1
⇒ 3n = 6
∴ n = 2
Question: If logm243 + logm81 = 9, find the value of m.
Solution:
Given that,
logm243 + logm81 = 9
⇒ logm(243 × 81) = 9
⇒ logm19683 = 9
⇒ m9 = 19683
⇒ m9 = 39
∴ m = 3
Question: Given 16x = 44, what is x?
Solution:
16x = 44
⇒ (42)x = 44
⇒ 42x = 44
⇒ 2x = 4
⇒ x = 4/2
∴ x = 2
Question: If logx(125/8) = - 3, what is the value of x?
Solution:
logx(125/8) = - 3
⇒ x- 3 = 125/8 [logb(a) = c ⇒ bc =a]
⇒ x- 3 = 53/23
⇒ x- 3 = (5/2)3
⇒ x- 3 = (2/5)- 3
∴ x = 2/5
Question: If x and y are positive real numbers, then (2x0 - 5y0)4 = ?
Solution:
We know that for any positive real number,
x0 = 1 and y0 = 1
So, (2x0 - 5y0)4
= (2 × 1 - 5 × 1)4
= (2 - 5)4
= (- 3)4
= 81
The value of (2x⁰ - 5y⁰)⁴ is 81
212n−64n
=(23)4n−64n
=84n−64n
=(82)2n−(62)2n
= 642n−362n (n=1)
= 642−362
=(64+36)(64−36)
=100×28 = 2800