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Algebra Problem: Find the Value of A in A + AA + AAA = 738
Published on May 7, 2025
Algebra
Solve the algebraic equation A + AA + AAA = 738 to find the value of the digit A. The solution involves simplifying the equation and solving for A.
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Published on May 7, 2025
Solve the algebraic equation A + AA + AAA = 738 to find the value of the digit A. The solution involves simplifying the equation and solving for A.
The Laplace transform of the piecewise function f(t) is calculated using Heaviside step functions and the time-shifting property of Laplace transforms. The result is expressed in terms of the exponential function and the reciprocal of s squared.
The function f(x,y) = -2x^2 + 3xy^2 - 3y^2 + 4 has a local maximum value of 4 at (0,0).
The double integral, using polar coordinates and integration by parts, evaluates to π(e^2 + 1).
The solution attempts to derive a reduction formula for the integral \(\int_0^\infty \frac{x}{\cosh^n(x)} dx\) using integration by parts and Feynman's trick, but ultimately finds that expressing the integral in terms of hypergeometric functions is a more suitable approach.
The integral \int_{0}^{\infty} \frac{x}{(\cosh x)^2} dx evaluates to ln(2).
To evaluate the limit, direct substitution results in an indeterminate form (0/0). Factoring the numerator reveals a common factor of (x-3), which cancels with the denominator. Substituting x=3 into the simplified expression yields a final answer of 58.
The integrals were evaluated using trigonometric substitution, partial fraction decomposition, and substitution. Integral c) was solved using trigonometric substitution, resulting in x/(√(1-x^2)) + C. Integral d) diverged to infinity. Integral e) was solved using partial fraction decomposition, leading to a solution involving natural logarithms and a constant term.
The inverse Laplace transform of 1/x^(3/2) is 2/(sqrt(pi))*sqrt(x).
The Laplace transform of sin^2(t) is 2 / (s * (s^2 + 4)).
The Laplace transform of e^(t/2) is 1/(s - 1/2), provided s > 1/2.