Set 4 - Important Questions on Logarithms
Duration: 9 min
This video lesson is available to enrolled students.
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This video is a mathematics lecture on logarithms, presented by an instructor from Knowledge Gate Eduventures. The lecture begins with an introduction to the topic, followed by a set of four problems labeled as 'Set 4'. The instructor systematically works through each problem, explaining the underlying mathematical principles. The first problem involves the logarithm of the tangent of 45 degrees, which is solved by recognizing that tan(45°) = 1 and log(1) = 0. The second problem is a product of logarithms of tangents from 1° to 89°, which is solved by pairing terms like log(tan(1°)) and log(tan(89°)) and using the identity tan(90°-θ) = cot(θ), which leads to the product being 1 and its log being 0. The third problem is a nested logarithm, log₂(log₃(81)), which is solved by simplifying the inner log first. The fourth problem is a sum of logarithms of tangents from 1° to 89°, which is solved by pairing terms and using the same identity, resulting in a sum of 0. The video concludes with a thank you message.
Chapters
0:00 – 2:00 00:00-02:00
The video opens with a title card for a lecture on logarithms, featuring a hand writing 'log y =' on a blackboard. The scene transitions to a collage of whiteboards with various logarithmic equations, including 'log_a x = y' and 'log_2(8) = 3'. The main title slide appears, stating 'Important Questions on Logarithms Set 4'. The instructor, Yash Jain, introduces the topic and presents the first problem: 'log tan(0.25π)'. He begins to solve it by writing 'log tan(π/4)' and then 'log 1', explaining that tan(π/4) = 1 and log(1) = 0, so the answer is 0. The on-screen text 'log tan(0.25π)' is clearly visible.
2:00 – 5:00 02:00-05:00
The instructor moves to the second problem: 'log₁₀ tan(1°) + log₁₀ tan(2°) + ... + log₁₀ tan(89°)'. He explains that this is a sum of logarithms, which can be written as a single logarithm of a product: 'log₁₀ (tan(1°) * tan(2°) * ... * tan(89°))'. He then pairs the terms: (tan(1°) * tan(89°)), (tan(2°) * tan(88°)), and so on. He uses the identity tan(90°-θ) = cot(θ) to show that tan(89°) = cot(1°), tan(88°) = cot(2°), etc. This means each pair becomes tan(θ) * cot(θ) = 1. The product of all these pairs is 1, so the logarithm of 1 is 0. The on-screen text 'log₁₀ tan(1°) + log₁₀ tan(2°) + ... + log₁₀ tan(89°)' is visible throughout this explanation.
5:00 – 8:33 05:00-08:33
The instructor proceeds to the third problem: 'log₂(log₃(81))'. He first simplifies the inner logarithm, log₃(81). He writes 'log₃(3⁴)' and explains that this equals 4. The expression then becomes 'log₂(4)'. He then simplifies this to 'log₂(2²)' which equals 2. The on-screen text 'log₂(log₃(81))' is visible. He then moves to the fourth problem: 'log₁₀ tan(1°) + log₁₀ tan(2°) + ... + log₁₀ tan(89°)'. He reiterates the pairing method, showing that tan(1°) * tan(89°) = tan(1°) * cot(1°) = 1, and similarly for all other pairs. The middle term, tan(45°), is 1, and log(1) = 0. The sum of all the logarithms is therefore 0. The video ends with a 'THANKS FOR WATCHING' screen.
The video presents a structured lesson on solving logarithmic problems, focusing on the application of key identities and properties. The core teaching method involves breaking down complex expressions into simpler components. The instructor demonstrates the use of the identity tan(90°-θ) = cot(θ) to pair terms in a sum or product, a powerful technique for simplifying trigonometric logarithmic expressions. The progression from a simple problem (log tan(45°)) to a more complex one (a sum of 89 terms) illustrates a clear pedagogical approach, building student confidence and understanding. The final synthesis of the lesson is the recognition that the sum of logarithms of tangents from 1° to 89° is zero, a result derived from the symmetry of the tangent function around 45°.