Table of Contents

• 1: Mix up your routine, as cicadas with prime number cycles
• 2: Grow in accessible directions, like Voronoi diagrams
• 3: Rely on your reasoning abilities, because folded paper may reach the moon
• 4: Define success for yourself, given Arrow's Impossibility Theorem
• 5: Reach for the stars, just like Katherine Johnson
• 6: Find the right match, as with binary numbers and computers
• 7: Act natural, because of Benford's Law
• 8: Resist comparison, because of chaos theory
• 9: Look all around, as Archimedes did in life
• 10: Walk through the problem, as on the Konigsborg bridges
• 11: Untangle problems, with knot theory
• 12: Consider all options, as the shortest path between two points is not always straight
• 13: Look for beauty, because of Fibonacci numbers
• 14: Divide and conquer, just like Riemann sums in calculus
• 15: Embrace change, considering non-Euclidean geometry
• 16: Pursue an easier approach, considering the Pigeonhole Principle
• 17: Make an educated guess, like Kepler with his Sphere-packing Conjecture
• 18: Proceed at your own pace, because of terminal velocity
• 19: Pay attention to details, as Earth is an oblate spheroid
• 20: Join the community, with Hilbert's 23 problems
• 21: Search for like-minded math friends, because of the Twin Prime Conjecture
• 22: Abandon perfectionism, because of the Hairy Ball Theorem
• 23: Enjoy the pursuit, as Andrew Wiles did with Fermat's Last Theorem
• 24: Design your own pattern, because of the Penrose Patterns
• 25: Keep it simple whenever possible, since
• 26: Change your perspective, with Viviani's Theorem
• 27: Explore, on a Mobius strip
• 28: Be contradictory, because of the infinitude of primes
• 29: Cooperate when possible, because of game theory
• 30: Consider the less-travelled path, because of the Jordan Curve Theorem
• 31: Investigate, because of the golden rectangle
• 32: Be okay with small steps, as the harmonic series grows without bound
• 33: Work efficiently, like bacteriophages with icosahedral symmetry
• 34: Find the right balance, as in coding theory
• 35: Draw a picture, as in proofs without words
• 36: Incorporate nuance, because of fuzzy logic
• 37: Be grateful when solutions exist, because of Brouwer's Fixed Point Theorem
• 38: Update your understanding, with Bayesian statistics
• 39: Keep an open mind, because imaginary numbers exist
• 40: Appreciate the process, by taking a random walk
• 41: Fail more often, just like Albert Einstein did with
• 42: Get disoriented, on a Klein bottle
• 43: Go outside your realm of experience, on a hypercube
• 44: Follow your curiosity, along a space-filling curve
• 45: Exercise your imagination, with fractional dimensions
• 46: Proceed with care, because some infinities are larger than others