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Find the eigenvalues of a 3x3 matrix.
Published on December 1, 2024
Linear-Algebra
The eigenvalues of the given 3x3 matrix are 1, 2, and 2.
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Published on December 1, 2024
The eigenvalues of the given 3x3 matrix are 1, 2, and 2.
The solution to the equation involving radicals and exponents is x = 77/120.
The solution for X in the equation 2^X + 2 = 66 is 6.
To solve for a in the equation (a/2) รท (5/2) = 2, first rewrite the division as multiplication by the reciprocal, then multiply the numerators and denominators, simplify the fraction, isolate a by multiplying both sides by 10, and finally solve for a by dividing both sides by 2, resulting in a = 10.
The rational function 1/(3x^2 + 4x + 1) is decomposed into partial fractions as (3/2)/(3x + 1) - (1/2)/(x + 1) by factoring the denominator and solving for the unknown constants using strategic values of x.
To find the difference between ba and ab, where a and b are digits, we analyze the units and hundreds digits, leading to the conclusion that the hundreds digit of the difference is 3.