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Chapters
2: Compound Interest
3: Expansions
4: Factorisation
5: Simultaneous Linear Equations
▶ 6: Indices/Exponents
7: Logarithms
8: Triangles
9: Mid-point Theorem
10: Pythagoras Theorem
11: Rectilinear Figures
12: Constructions of Polygons
13: Theorems on Area
14: Circles
15: Statistics
16: Mensuration
17: Trigonometric Ratios
18: Trigonometric Ratios of Some Standard Angles and Complementary Angles
19: Co-ordinate Geometry: An Introduction
![Nootan solutions for मैथमैटिक्स [अंग्रेजी] कक्षा ९ आईसीएसई chapter 6 - Indices/Exponents - Shaalaa.com](/images/mathematics-english-class-9-icse_6:f26eb985e8254aa987299226050d7c71.jpg "Nootan solutions for मैथमैटिक्स [अंग्रेजी] कक्षा ९ आईसीएसई chapter 6 - Indices/Exponents")
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Solutions for Chapter 6: Indices/Exponents
Below listed, you can find solutions for Chapter 6 of CISCE Nootan for मैथमैटिक्स [अंग्रेजी] कक्षा ९ आईसीएसई.
Nootan solutions for मैथमैटिक्स [अंग्रेजी] कक्षा ९ आईसीएसई 6 Indices/Exponents Exercise 6A [Page 129]
Simplify the following:
a7 × a5
Simplify the following:
`a^9/a^4`
Simplify the following:
`(a^7 xx a^4)/a^3`
Simplify the following:
`(x^4 xx x^5)/(x^3 xx x^-1)`
Simplify the following:
`(3x^4y^2(2xy)^5)/((2x^3y^3)^2`
Simplify the following:
`((x^(2a + 3))^5)/((x^(a + 1))^3`
Simplify the following:
`((xy^3)^2(3x^2y)^4)/(xy)^3`
Simplify the following:
`(x^3y^4z^2)/(x^2y^-1z^3)`
Simplify the following:
`(6^(2n + 6) - 6^3 * 36^(n + 1))/(6^(n + 2))^2`
Simplify the following:
`(2^(n + 2) xx 4^(n + 1))/(2^(n + 1) xx 4^(n - 2))`
Simplify the following:
`(5^(n + 5) - 6 xx 5^(n + 3))/(9 xx 5^(n + 1) - 20 xx 5^n)`
Simplify the following:
`(3^(n + 4) xx 3^((n - 2)(n + 2)))/(3^(n(n + 1)) xx 9^(n + 1))`
Write `(x^-1 - y^-1)/(x^-2 - y^-2)` in the simplest form.
Simplify:
`((a^(x + y))^(x - y)(a^(y - z))^(y + z))/((a^(x + z))^(x - z))`
Find the value of x and y from the following:
2x · 3y = 144
Find the value of x and y from the following:
3x · 5y = 675
Find the values of x, y and z from the following:
2x · 3y · 5z = 24000
If a = bx, b = cy and c = az prove that xyz = 1.
Prove that `(a^x/a^y)^(x + y) (a^y/a^z)^(y + z) (a^z/a^x)^(z + x) = 1`.
Prove that `(x^a/x^b)^(a^2 + ab + b^2) (x^b/x^c)^(b^2 + bc + c^2) (x^c/x^a)^(c^2 + ca + a^2) = 1`.
Prove that:
`1/(1 + x^(b - a) + x^(c - a)) + 1/(1 + x^(a - b) + x^(c - b)) + 1/(1 + x^(b - c) + x^(a - c)) = 1`
Prove that `(x + y + z)/((xy)^-1 + (yz)^-1 + (zx)^-1) = xyz`.
If `x = a^(m + n), y = a^(n + l)` and `z = a^(l + m),` prove that `x^my^nz^l = x^ny^lz^m`
If `x = p^(m + n) * q^l, y = p^(n + l) * q^m, z = p^(l + m) * q^n` prove that `x^(m - l) * y^(n - l) * z^(l - m) = 1`.
If `a = x * y^(p - 1), b = x * y^(q - 1), c = x * y^(r - 1)`, prove that `a^(q - r) * b^(r - p) * c^(p - q) = 1`.
If 2x = 3y = 72z, find the relation between x, y and z.
If 3x = 5y = 225z, find the relation between x, y and z.
Nootan solutions for मैथमैटिक्स [अंग्रेजी] कक्षा ९ आईसीएसई 6 Indices/Exponents Exercise 6B [Page 131]
Evaluate the following:
`(243)^(1/5)`
Evaluate the following:
`(64)^(-3/2)`
Evaluate the following:
`(-32)^(2/5)`
Evaluate the following:
`(216)^(4/3)`
Evaluate the following:
`(25/9)^(3/2) + (27/64)^(-1/3)`
Evaluate the following:
`(81/256)^(1/4) xx (32/243)^((-2)/5)`
Evaluate the following:
`5^-1 xx 3^0 + 25^(1/2)`
Evaluate the following:
`3^-2 xx 2^0 - (27)^(-1/3)`
Evaluate the following:
`(27)^(4/3) - 5^0 xx (1/9)^(-3/2) + (81)^(1/2)`
Evaluate the following:
`(sqrt(3^4) xx root(3)(27))/(root(4)(81)) + (1/2)^-2`
Evaluate the following:
`(root(4)(2^8) xx root(5)(243) xx 5^0)/root(3)(216)`
If x = 2, y = 3, find xx + y–y.
If x = –2, y = –3, find xx + yy.
If x = 4, y = 3, find xy + yx.
If x = –1, y = 2, z = –3, find xy + yx + zx.
If x = 2, y = 3, z = 4, find xz + y–x + zy.
Nootan solutions for मैथमैटिक्स [अंग्रेजी] कक्षा ९ आईसीएसई 6 Indices/Exponents Exercise 6C [Page 133]
Solve the following equation:
`2^(3x - 2) = 1`
Solve the following equation:
`3^(5x - 1) = root(4)(3)`
Solve the following equation:
`5^(3x - 1) = root(3)(5)`
Solve the following equation:
`2^(4x + 1) = root(4)(256)`
Solve the following equation:
`2^(3x + 1) = 16 xx 2^(2x)`
Solve the following equation:
`2^(4x - 3) = 4 xx 2^(2x - 1)`
Solve the following equation:
22x – 5.2x + 4 = 0
Solve the following equation:
`3^(2x + 3) - 28.3^x + 1 = 0`
Solve the following equation:
`4^(x^2) : 4^x = 16 : 1`
Solve the following equation:
`3^(2x + 1) = 3^(2x - 1) + 216`
If `a^x * b^(3y) = root(4)(a^3 * b^-6)`, find the values of x and y, where a and b are different positive prime numbers.
Solve:
`sqrt((4/3)^(1 - 3x)) = 2 10/27`
Solve:
`sqrt((2/5)^(4x - 3)) = 15 5/8`
If `2^(3x) = (root(3)(32))^(4/y) = (sqrt(8))^5`, then find the values of x and y.
If `5^(2x - 1) = 5^(2x - 2) + 100`, find the value of (2x)3x.
If `3^(3x + 1) = 3^(3x - 1) + 72`, find the value of `(3x + 1)^(2x)`.
Solve for x and y:
`8^(3 - x/2) - 2^(2y) = 0` and `(sqrt(32))^x ÷ 2^y = 4`
Nootan solutions for मैथमैटिक्स [अंग्रेजी] कक्षा ९ आईसीएसई 6 Indices/Exponents Exercise 6D [Pages 133 - 134]
Multiple Choice Questions Choose the correct answer from the given four options in each of the following questions:
x0 is equal to ______.
0
1
x
None of these
a5 × a–5 is equal to ______.
0
1
a–10
a
`(x^4 xx x^3)/x^9` is equal to ______.
x2
x
`1/x`
`1/x^2`
If x = 3, y = 2, then the value of xx + yy is ______.
42
35
31
17
(81)0.18 × (81)0.07 is equal to ______.
9
3
27
81
If `2^(2x + 2) - 5 * 2^x + 1 = 0`, then the value of x is ______.
0
1
–1
2
If 2x · 3y = 288, then the value of y is ______.
1
2
–2
–1
If a = bx, b = cy, c = az, then the value of 8 xyz is ______.
1
2
4
8
`(a^x/(a^-y))^(x - y) (a^y/a^-z)^(y - z) (a^z/a^-x)^(z - x)` is equal to ______.
0
1
a
axyz
`(3^(n + 1) xx 9^(n - 1))/(3^n xx 9^(n + 1))` is equal to ______.
27
9
`1/9`
`1/27`
Valid Statements Questions In the following questions, two statements (i) and (ii) are given. Choose the valid statement.
(i) lf x = 2, y = 1 then xx + yy = 5.
(ii) If a = bx, b = cy, c = az then xyz = 1.
Only (i)
Only (ii)
Both (i) and (ii)
Neither (i) nor (ii)
(i) lf m ≠ n and (m + n)–1 (m–1 + n–1) = mxny then x + y = 2.
(ii) If 2x = 3y = 108z then `2/y + 3/z = 1/x`
Only (i)
Only (ii)
Both (i) and (ii)
Neither (i) nor (ii)
(i) `(a^x/a^y)^(x + y) * (a^y/a^z)^(y + z) * (a^z/a^x)^(z + x) = 1`
(ii) am × an = am – n
Only (i)
Only (ii)
Both (i) and (ii)
Neither (i) nor (ii)
(i) `(64)^(-3//2) = 512`
(ii) `5^-1 xx 3^0 = 1/5`
Only (i)
Only (ii)
Both (i) and (ii)
Neither (i) nor (ii)
Solutions for 6: Indices/Exponents
Nootan solutions for मैथमैटिक्स [अंग्रेजी] कक्षा ९ आईसीएसई chapter 6 - Indices/Exponents
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