What is the personality type of Émilie du Châtelet? Which MBTI personality type best fits? Personality type for Émilie du Châtelet from Mathematics and what is the personality traits.
Émilie du Châtelet personality type is INFJ, which makes sense since she is a rare example of a female INFJ. If we look at Keirsey’s descriptions of INFJ and INTJ and the way that they relate to the Enneagram, we see that the INFJ’s primary motive is their search for understanding. [In other words, they are primarily driven by their desire for knowledge.] In contrast, the INTJ’s primary motive is their drive for power and control. [In other words, they are primarily driven by their desire for control.] This is why INFJs are described as being more idealistic and less pragmatic or realistic in their approach. [In other words, they are primarily driven by their desire for understanding over power and control over knowledge.] Since Keirsey identifies a similarity between Keirsey’s descriptions of INFJ and INTJ and the Enneagram, we can use the Enneagram to look at how INFJs relate to the other types. The following table shows how each type relates to INFJ on the Enneagram. If you look at these types on the Enneagram, you will see that the INFJ’s primary motives are their desire for knowledge and their desire for understanding.
Gabrielle Émilie Le Tonnelier de Breteuil, Marquise du Châtelet; 17 December 1706 – 10 September 1749) was a French natural philosopher and mathematician during the early 1730s until her untimely death due to childbirth complications in 1749. Her most recognized achievement is her translation of and commentary on Isaac Newton's 1687 book Principia containing basic laws of physics. The translation, published posthumously in 1756, is still considered the standard French translation today. Her commentary includes a profound contribution to Newtonian mechanics—the postulate of an additional conservation law for total energy, of which kinetic energy of motion is one element. This led to her conceptualization of energy as such, and to derive its quantitative relationships to the mass and velocity of an object.