a little monkey was sitting on a tree. she was bored and she wanted to eat. she got down the tree and looked through the jungle to find a banana of a mango. but there was no fruits and even no tasty leafs. she was upset. she wandered through the jungle and meet her friends - green crocodile and bright parrot. parrot was very hungry too because he also couldn't find anything to eat. they decided to walk together. in a minute they noticed a huge yelow banana lying on the floor. monkey clutched it and at once many hunters with guns run to the glade.
friends started to run away. they ran through the bush and high grass and they saved their lives from the crafty hunters
1. Формула для объёма всего "пирамидообразного" V1 = 1/3 * S1 * h1 Формула для объема призмы V2 = S2 h2.
Пусть в основании квадрат с радиусом 2а. Тогда S1 = pi * a^2 S2 = 4a^2 h2 = h1 V2 / V1 = 3 S2 h2 / (S1 h1) = 3 * 4 / pi = 12 / pi
2. Если линейные размеры увеличить в k раз, площади увеличиваются в k^2 раз, объемы - в k^3 раз. Кол-во краски пропорционально площади поверхности.
Понадобится 100 * 3^2 = 900 г краски
3) Радиусы равны 3 и 5. В осевом сечении - равнобедренная трапеция с основаниями 6 и 10, в которую можно вписать окружность. Окружность можно вписать, если суммы длин противоположных сторон равны. Тогда бок. сторона = образующая = (6 + 10) / 2 = 8 S = pi (r1 + r2) l = pi (3 + 5) * 8 = 64pi
a little monkey was sitting on a tree. she was bored and she wanted to eat. she got down the tree and looked through the jungle to find a banana of a mango. but there was no fruits and even no tasty leafs. she was upset. she wandered through the jungle and meet her friends - green crocodile and bright parrot. parrot was very hungry too because he also couldn't find anything to eat. they decided to walk together. in a minute they noticed a huge yelow banana lying on the floor. monkey clutched it and at once many hunters with guns run to the glade.
friends started to run away. they ran through the bush and high grass and they saved their lives from the crafty hunters
Формула для объема призмы V2 = S2 h2.
Пусть в основании квадрат с радиусом 2а. Тогда
S1 = pi * a^2
S2 = 4a^2
h2 = h1
V2 / V1 = 3 S2 h2 / (S1 h1) = 3 * 4 / pi = 12 / pi
2. Если линейные размеры увеличить в k раз, площади увеличиваются в k^2 раз, объемы - в k^3 раз.
Кол-во краски пропорционально площади поверхности.
Понадобится 100 * 3^2 = 900 г краски
3) Радиусы равны 3 и 5.
В осевом сечении - равнобедренная трапеция с основаниями 6 и 10, в которую можно вписать окружность. Окружность можно вписать, если суммы длин противоположных сторон равны. Тогда бок. сторона = образующая = (6 + 10) / 2 = 8
S = pi (r1 + r2) l = pi (3 + 5) * 8 = 64pi