The vase shown below can be described as a cylinder with a varying radius. Using a y-coordinate which starts at the bottom and then runs all the way up, the shape can be described by the equation of y=|3x| How high will the surface of the water in the vase be, measured from the bottom, when a bottle of water of 0.750 litres (around 750 cm³) is poured in this vase? Also create a flowchart of the algorithm to solve that problem (use StarUML) ! Some hints: Calculate the volume by summing the small volumes of the flat cylinders of with a height of Ay given by the volume of a disc: AV = ar²Ay starting from the bottom of the vase. Give your answer h in cm for a complete bottle of 750 cm³, rounded off to 1 digit behind the decimal point.

The vase shown below can be described as a cylinder with a varying radius. Using a y-coordinate which starts at the bottom and then runs all the way up, the shape can be described by the equation of y=|3x| How high will the surface of the water in the vase be, measured from the bottom, when a bottle of water of 0.750 litres (around 750 cm³) is poured in this vase? Also create a flowchart of the algorithm to solve that problem (use StarUML) ! Some hints: Calculate the volume by summing the small volumes of the flat cylinders of with a height of Ay given by the volume of a disc: AV = ar²Ay starting from the bottom of the vase. Give your answer h in cm for a complete bottle of 750 cm³, rounded off to 1 digit behind the decimal point.

Database System Concepts

7th Edition

ISBN:9780078022159

Author:Abraham Silberschatz Professor, Henry F. Korth, S. Sudarshan

Publisher:Abraham Silberschatz Professor, Henry F. Korth, S. Sudarshan

Chapter1: Introduction

Section: Chapter Questions

Problem 1PE

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Question

Use Python

The vase shown below can be described as a cylinder with a varying radius. Using a y-coordinate
which starts at the bottom and then runs all the way up, the shape can be described by the
equation of y=|3x|
How high will the surface of the water in the vase be, measured from the bottom, when a bottle
of water of 0.750 litres (around 750 cm³) is poured in this vase? Also create a flowchart of the
algorithm to solve that problem (use StarUML) !
Some hints:
Calculate the volume by summing the small volumes of the flat cylinders of with a height of Ay
given by the volume of a disc: AV = ar²Ay starting from the bottom of the vase.
Give your answer h in cm for a complete bottle of 750 cm³, rounded off to 1 digit behind the
decimal point.

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