The irrational number (approximately 1·618), usually denoted by the Greek letter φ (phi), which is equal the sum of its own reciprocal and 1, or, equivalently, is such that the ratio of 1 to the number is equal to the ratio of its reciprocal to 1.
The irrational number (roughly 1·618), typically denoted by the Greek-letter φ (phi), which will be equal the sum of the its own reciprocal and 1, or, equivalently, is such that the proportion of just one towards number is equivalent to the proportion of the reciprocal to at least one.
The irrational quantity (about 1·618), generally denoted because of the Greek-letter φ (phi), which is equal the sum of a unique reciprocal and 1, or, equivalently, is so that the proportion of just one towards number is equal to the ratio of the reciprocal to at least one.
The irrational number (roughly 1·618), usually denoted by the Greek-letter φ (phi), that will be equal the sum a unique reciprocal and 1, or, equivalently, is so that the ratio of just one toward number is equivalent to the ratio of the mutual to at least one.
The irrational quantity (more or less 1·618), often denoted because of the Greek letter φ (phi), which will be equal the sum its reciprocal and 1, or, equivalently, is such that the proportion of just one on number is equivalent to the proportion of the reciprocal to 1.
The unreasonable quantity (about 1·618), usually denoted because of the Greek-letter φ (phi), that is equal the sum of the unique mutual and 1, or, equivalently, is such that the proportion of 1 into the number is equivalent to the ratio of the reciprocal to at least one.
The irrational quantity (about 1·618), typically denoted by the Greek-letter φ (phi), which will be equal the sum of its very own mutual and 1, or, equivalently, is in a way that the ratio of just one on number is equivalent to the ratio of their reciprocal to at least one.
The irrational number (about 1·618), frequently denoted by the Greek-letter φ (phi), that is equal the sum of its reciprocal and 1, or, equivalently, is so that the proportion of just one into number is equal to the ratio of their reciprocal to 1.
The irrational number (approximately 1·618), usually denoted by the Greek letter φ (phi), which is equal the sum of its own reciprocal and 1, or, equivalently, is such that the ratio of 1 to the number is equal to the ratio of its reciprocal to 1.
The unreasonable number (more or less 1·618), frequently denoted by the Greek-letter φ (phi), which is equal the sum a unique reciprocal and 1, or, equivalently, is in a way that the proportion of 1 to the number is equal to the proportion of its reciprocal to at least one.
The irrational number (around 1·618), usually denoted by the Greek letter φ (phi), which is equal the sum of the unique reciprocal and 1, or, equivalently, is so that the ratio of just one into the quantity is equivalent to the proportion of the mutual to at least one.
The unreasonable quantity (around 1·618), typically denoted by the Greek-letter φ (phi), which is equal the sum a unique mutual and 1, or, equivalently, is in a way that the proportion of just one into the quantity is equivalent to the proportion of the mutual to at least one.
The irrational number (approximately 1·618), usually denoted by the Greek letter φ (phi), which is equal the sum of its own reciprocal and 1, or, equivalently, is such that the ratio of 1 to the number is equal to the ratio of its reciprocal to 1.
How would you define golden ratio?