Find the value of x, when: (i) log₂ x = -2 (ii) logₓ 9 = 1 (iii) log₉ 243 = x (iv) log₃ x = 0 (v) (x − 1)√3 = 2 (vi) log₅ (x2 − 19) = 3 (vii) logₓ 64 = (viii) log₂ (x2 − 9) = 4 (ix) logₓ (0.008) = −3

(i) Given, ⇒ log2 x = -2 ⇒ x = 2-2 ⇒ x = ⇒ x = Hence, x = . (ii) Given, ⇒ logx 9 = 1 ⇒ 9 = x1 ⇒ x = 9. Hence, x = 9. (iii) Given, ⇒ log9 243 = x ⇒ 243 = 9x ⇒ 35 = (32)x ⇒ 35 = 32x Equating the exponents, ⇒ 2x = 5 ⇒ x = . Hence, x = . (iv) Given, ⇒ log3 x = 0 ⇒ x = 30 ⇒ x = 1. Hence, x = 1. (v) Given, Hence, x = 4. (vi) Given, ⇒ log5 (x2 − 19) = 3 ⇒ (x2 − 19) = 53 ⇒ x2 − 19 = 125 ⇒ x2 = 125 + 19 ⇒ x2 = 144 ⇒ x = ⇒ x = 12. Hence, x = 12. (vii) Given, Hence, x = 16. (viii) Given, ⇒ log2 (x2 − 9) = 4 ⇒ (x2 − 9) = 24 ⇒ x2 − 9 = 16 ⇒ x2 = 16 + 9 ⇒ x2 = 25 ⇒ x = ⇒ x = 5 Hence, x = 5. (ix) Given, ⇒ logx (0.008) = −3 ⇒ 0.008 = x−3 ⇒ = x−3 ⇒ = x−3 ⇒ = x−3 ⇒ 5−3 = x−3 Equating the bases, ⇒ x = 5. Hence, x = 5.

Mathematics

Find the value of x, when:
(i) log₂ x = -2
(ii) log_x 9 = 1
(iii) log₉ 243 = x
(iv) log₃ x = 0
(v) $\log _{\sqrt{3}}$ (x − 1) = 2
(vi) log₅ (x² − 19) = 3
(vii) log_x 64 = $\dfrac{3}{2}$
(viii) log₂ (x² − 9) = 4
(ix) log_x (0.008) = −3

Logarithms

2 Likes

Answer

(i) Given,

⇒ log₂ x = -2

⇒ x = 2^-2

⇒ x = $\dfrac{1}{2^2}$

⇒ x = $\dfrac{1}{4}$

Hence, x = $\dfrac{1}{4}$ .

(ii) Given,

⇒ log_x 9 = 1

⇒ 9 = x¹

⇒ x = 9.

Hence, x = 9.

(iii) Given,

⇒ log₉ 243 = x

⇒ 243 = 9^x

⇒ 3⁵ = (3²)^x

⇒ 3⁵ = 3^2x

Equating the exponents,

⇒ 2x = 5

⇒ x = $\dfrac{5}{2}$ .

Hence, x = $\dfrac{5}{2}$ .

(iv) Given,

⇒ log₃ x = 0

⇒ x = 3⁰

⇒ x = 1.

Hence, x = 1.

(v) Given,

$\Rightarrow \log_{\sqrt{3}} \space (x − 1) = 2 \\[1em] \Rightarrow (x − 1) = (\sqrt{3})^2 \\[1em] \Rightarrow (x − 1) = 3 \\[1em] \Rightarrow x = 3 + 1 \\[1em] \Rightarrow x = 4$

Hence, x = 4.

(vi) Given,

⇒ log₅ (x² − 19) = 3

⇒ (x² − 19) = 5³

⇒ x² − 19 = 125

⇒ x² = 125 + 19

⇒ x² = 144

⇒ x = $\sqrt{144}$

⇒ x = ±12.

Hence, x = ± 12.

(vii) Given,

$\Rightarrow \log_x \space 64 = \dfrac{3}{2} \\[1em] \Rightarrow 64 = x ^ \dfrac{3}{2} \\[1em] \Rightarrow 64^{\dfrac{2}{3}} = x ^{\Big(\dfrac{3}{2} \times \dfrac{2}{3} \Big)} \\[1em] \Rightarrow x = 64^{\dfrac{2}{3}} \\[1em] \Rightarrow x = (4^3)^\dfrac{2}{3} \\[1em] \Rightarrow x = 4^2 \\[1em] \Rightarrow x = 16.$

Hence, x = 16.

(viii) Given,

⇒ log₂ (x² − 9) = 4

⇒ (x² − 9) = 2⁴

⇒ x² − 9 = 16

⇒ x² = 16 + 9

⇒ x² = 25

⇒ x = $\sqrt{25}$

⇒ x = ±5

Hence, x = ±5.

(ix) Given,

⇒ log_x (0.008) = −3

⇒ 0.008 = x⁻³

⇒ $\dfrac{8}{1000}$ = x⁻³

⇒ $\dfrac{1}{125}$ = x⁻³

⇒ $\dfrac{1}{5^3}$ = x⁻³

⇒ 5⁻³ = x⁻³

Equating the bases,

⇒ x = 5.

Hence, x = 5.

Answered By

1 Like

Mathematics

Find the value of x, when:
(i) log₂ x = -2
(ii) log_x 9 = 1
(iii) log₉ 243 = x
(iv) log₃ x = 0
(v) $\log _{\sqrt{3}}$ (x − 1) = 2
(vi) log₅ (x² − 19) = 3
(vii) log_x 64 = $\dfrac{3}{2}$
(viii) log₂ (x² − 9) = 4
(ix) log_x (0.008) = −3

Logarithms

Answer

Related Questions

Convert each of the following to exponential form:
(i) log₃ 81 = 4
(ii) log₈ 4 = $\dfrac{2}{3}$
(iii) log₂ $\dfrac{1}{8}$ = -3
(iv) log₁₀ (0.01) = -2
(v) log₅ $\Big(\dfrac{1}{5}\Big)$ = -1
(vi) log_a 1 = 0

By converting to exponential form, find the value of each of the following:
(i) log₂ 64
(ii) log₈ 32
(iii) log₃ $\dfrac{1}{9}$
(iv) log_0.5 (16)
(v) log₂ (0.125)
(vi) log₇ 7

If log₁₀ x = p and log₁₀ y = q, show that xy = (10)^{p + q}.

Given log₁₀ x = a, log₁₀ y = b,
(i) Write down 10^{a + 1} in terms of x.
(ii) Write down 10^2b in terms of y.
(iii) If log₁₀ P = 2a − b, express P in terms of x and y.

Mathematics

Find the value of x, when:(i) log2 x = -2(ii) logx 9 = 1(iii) log9 243 = x(iv) log3 x = 0(v) log⁡3\log _{\sqrt{3}}log3​​ (x − 1) = 2(vi) log5 (x2 − 19) = 3(vii) logx 64 = 32\dfrac{3}{2}23​(viii) log2 (x2 − 9) = 4(ix) logx (0.008) = −3

Logarithms

Answer

Related Questions

Convert each of the following to exponential form:(i) log3 81 = 4(ii) log8 4 = 23\dfrac{2}{3}32​(iii) log2 18\dfrac{1}{8}81​ = -3(iv) log10 (0.01) = -2(v) log5 (15)\Big(\dfrac{1}{5}\Big)(51​) = -1(vi) loga 1 = 0

By converting to exponential form, find the value of each of the following:(i) log2 64(ii) log8 32(iii) log3 19\dfrac{1}{9}91​(iv) log0.5 (16)(v) log2 (0.125)(vi) log7 7

If log10 x = p and log10 y = q, show that xy = (10)p + q.

Given log10 x = a, log10 y = b,(i) Write down 10a + 1 in terms of x.(ii) Write down 102b in terms of y.(iii) If log10 P = 2a − b, express P in terms of x and y.

Find the value of x, when:
(i) log₂ x = -2
(ii) log_x 9 = 1
(iii) log₉ 243 = x
(iv) log₃ x = 0
(v) $\log _{\sqrt{3}}$ (x − 1) = 2
(vi) log₅ (x² − 19) = 3
(vii) log_x 64 = $\dfrac{3}{2}$
(viii) log₂ (x² − 9) = 4
(ix) log_x (0.008) = −3

Convert each of the following to exponential form:
(i) log₃ 81 = 4
(ii) log₈ 4 = $\dfrac{2}{3}$
(iii) log₂ $\dfrac{1}{8}$ = -3
(iv) log₁₀ (0.01) = -2
(v) log₅ $\Big(\dfrac{1}{5}\Big)$ = -1
(vi) log_a 1 = 0

By converting to exponential form, find the value of each of the following:
(i) log₂ 64
(ii) log₈ 32
(iii) log₃ $\dfrac{1}{9}$
(iv) log_0.5 (16)
(v) log₂ (0.125)
(vi) log₇ 7

If log₁₀ x = p and log₁₀ y = q, show that xy = (10)^{p + q}.

Given log₁₀ x = a, log₁₀ y = b,
(i) Write down 10^{a + 1} in terms of x.
(ii) Write down 10^2b in terms of y.
(iii) If log₁₀ P = 2a − b, express P in terms of x and y.