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Question 1 of 15
The product of a²b^4 and a³b^5 is
O level Indices and Logarithm Quiz 1
15 QuestionsMultiple ChoiceFree Practice
About this quiz
This O level Indices and Logarithm Quiz 1 quiz contains 15 multiple choice questions designed to help you revise and test your O level Indices and Logarithm Quizzes knowledge. Select an answer for each question and click “Submit Answer” to see instant feedback. Take your time and try to score as high as possible!
Description
In this quiz, we shall be revising indices and logarithms with questions that have been set based on the national curriculum for the gce ordinary level. The topics indices and logarithms are the basics of mathematics as principles and laws from indices and logarithm are applied in so many other aspects of mathematics and not just mathematics, Physics, chemistry and other subjects too. Here, we are going to cover the basics of this topic using questions.
Indices (Sometimes-called powers) are notations used to shorthand expressions involving numbers multiplied by themselves a number of times whereas Logarithm is the exponent or power to which a base must be raised to yield a given number.
O level indices and logarithms quiz 1 is just one of the numerous o level mathematics quizzes that have been made available for you in this platform. If you wish to answer past questions in o level Mathematics, click Here.
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Progress0 / 15 answered
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Question 2 of 15
The product of y^7 and y³ is equal to
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Question 3 of 15
The answer of (9.5 x 10^5) ⁄ (10^4) in ordinary notation is
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Question 4 of 15
If (3^6) ⁄ 27 = 3^x then the value of 'x' is
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Question 5 of 15
If (9^4 )2 = 3^x then the value of 'x' is
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Question 6 of 15
The product of b and 5b³ is
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Question 7 of 15
By evaluating the (4⁄5)^-2 ⁄ (3)^0 , the result will be
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Question 8 of 15
On evaluating (512)^(1⁄3) , the answer will be
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Question 9 of 15
The sum of 45 nanometers and 75 picometers (in standard form) is
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Question 10 of 15
The answer of 6.2 x 10^-5 in ordinary notation is
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Question 11 of 15
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Question 12 of 15
What is the value of x in the logarithmic equation
log(x+2) - log(x-1) = log(2)
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Question 13 of 15
The logarithms having base ‘10’ are called
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Question 14 of 15
Loga(mn) equals to
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Question 15 of 15
10² = 100 can be written in the form of logarithm as