DAY-1
MOST IMPORTANT FORMULAS
This image displays the formula for the Fourier Transform, which decomposes a signal into its constituent frequencies.
Significance: It is a fundamental mathematical tool in science and engineering used for analyzing complex signals.
Applications: It is widely used in signal processing to filter noise and in image processing for data compression.
History: The concept was developed by Joseph Fourier, originally to analyze heat flow.
@EDMATHLAB
MOST IMPORTANT FORMULAS
This image displays the formula for the Fourier Transform, which decomposes a signal into its constituent frequencies.
Significance: It is a fundamental mathematical tool in science and engineering used for analyzing complex signals.
Applications: It is widely used in signal processing to filter noise and in image processing for data compression.
History: The concept was developed by Joseph Fourier, originally to analyze heat flow.
@EDMATHLAB
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MATHS 🧮 LAB 🔬
A day in life😂🔥 @edmathlab
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Most important formulas
Day-2
This image displays a fundamental result in number theory known as Fermat's Little Theorem. Formula: The equation (a^(p-1)=1 (mod p) states that if (p) is a prime number and (a) is an integer not divisible by (p), then (a^{p-1}) leaves a remainder of 1 when divided by (p).
Alternative Form: An equivalent form of the theorem is a^p = a (mod p), which holds true for all integers (a) .
@edmathlab
Day-2
This image displays a fundamental result in number theory known as Fermat's Little Theorem. Formula: The equation (a^(p-1)=1 (mod p) states that if (p) is a prime number and (a) is an integer not divisible by (p), then (a^{p-1}) leaves a remainder of 1 when divided by (p).
Alternative Form: An equivalent form of the theorem is a^p = a (mod p), which holds true for all integers (a) .
@edmathlab
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Most important formulas
Day-3
The above equation represents the Jordan normal form of a matrix A. This form is a canonical representation of a square matrix over a field. J is the Jordan matrix, which is a block diagonal matrix composed of Jordan blocks. P is an invertible matrix. The concept is named after the French mathematician Camille Jordan, who discovered it.
@edmathlab
Day-3
The above equation represents the Jordan normal form of a matrix A. This form is a canonical representation of a square matrix over a field. J is the Jordan matrix, which is a block diagonal matrix composed of Jordan blocks. P is an invertible matrix. The concept is named after the French mathematician Camille Jordan, who discovered it.
@edmathlab
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An equilateral triangle has only two of its sides equal. True or false?
Anonymous Quiz
24%
True
76%
False
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Find the derivative of
f(x) =3x⁴-5x²+7
f(x) =3x⁴-5x²+7
Anonymous Quiz
17%
f'(x) = 12x³ +10x
36%
f'(x) = 12x³ - 10x²
47%
f'(x) = 12x³-10x
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