There lived an astronomer who was very much involved in his observations.
He often used to look up at the sky at night and start observing the stars.
Once, as he walked looking up at the stars, his leg slipped and he fell into a ditch. He started shouting.
A passer-by, who heard his shouts, helped him out of the ditch and asked, "How did you fall into this ditch?" The astronomer replied, “I was so engrossed in my observations that I did not notice the ditch".
The passer-by asked, "How do you expect to discover things when you fail to take note of things under your nose?" The astronomer walked away with a sad face.
There lived an astronomer who was very much involved in his observations.
He often used to look up at the sky at night and start observing the stars.
Once, as he walked looking up at the stars, his leg slipped and he fell into a ditch. He started shouting.
A passer-by, who heard his shouts, helped him out of the ditch and asked, "How did you fall into this ditch?" The astronomer replied, “I was so engrossed in my observations that I did not notice the ditch".
The passer-by asked, "How do you expect to discover things when you fail to take note of things under your nose?" The astronomer walked away with a sad face.
Пошаговое объяснение:
думаю правильно
Приведение к стандартному виду:
\begin{gathered}\displaystyle 2,\!1 \cdot a^2 b^2 c^4 \cdot \bigg ( - 1\frac{3}{7} \bigg ) \cdot bc^3 d = - \bigg ( \frac{21}{10} \cdot \frac{10}{7} \bigg ) \cdot a^2 \cdot b^2b \cdot c^4c^3 \cdot d = = - \frac{21}{7} \cdot a^2 \cdot b^{2+1} \cdot c^{4+3} \cdot d = \boxed {- 3a^2 b^3c ^7d}\end{gathered}2,1⋅a2b2c4⋅(−173)⋅bc3d=−(1021⋅710)⋅a2⋅b2b⋅c4c3⋅d==−721⋅a2⋅b2+1⋅c4+3⋅d=−3a2b3c7d
Коэффициент одночлена: \boxed {-3}−3 .
Задание 2.
Формула для нахождения объема прямоугольного параллелепипеда (VV - объем; xx , yy , zz - измерения прямоугольного параллелепипеда): V=xyzV=xyz .
Значит, объем исходного параллелепипеда равен:
\begin{gathered}V = \Big (4a^2b^5 \Big ) \cdot \Big (3ab^2 \Big ) \cdot \Big (2ab \Big ) = \Big (4 \cdot 3 \cdot 2 \Big ) \cdot a^2aa \cdot b^5b^2b = = 24 \cdot a^{2+1+1} \cdot b^{5+2+1} =\boxed {24a^4b^8}\end{gathered}V=(4a2b5)⋅(3ab2)⋅(2ab)=(4⋅3⋅2)⋅a2aa⋅b5b2b==24⋅a2+1+1⋅b5+2+1=24a4b8