Two planes are gaining elevation at 6:00 am. Airplane #1 has an elevation of 12890 ft and climbs 1750 feet every 5 minutes. Airplane #2 has an elevation of 6010 ft and climbs 1650 feet every 3 minutes. Let t represent the time in minutes since 6:00 am, and let E represent the elevation in feet. Write the Linear functions for the elevations of each plane in terms of t. plane # 1: E(t) = %3D plane #2: E(t) How long after 6:00 am will the planes have the same elevation? minutes What is the elevation at that time? feet

Two planes are gaining elevation at 6:00 am. Airplane #1 has an elevation of 12890 ft and climbs 1750 feet every 5 minutes. Airplane #2 has an elevation of 6010 ft and climbs 1650 feet every 3 minutes. Let t represent the time in minutes since 6:00 am, and let E represent the elevation in feet. Write the Linear functions for the elevations of each plane in terms of t. plane # 1: E(t) = %3D plane #2: E(t) How long after 6:00 am will the planes have the same elevation? minutes What is the elevation at that time? feet

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter3: Functions And Graphs

Section3.5: Graphs Of Functions

Problem 14E

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Concept explainers

Transformation of Graphs

The word ‘transformation’ means modification. Transformation of the graph of a function is a process by which we modify or change the original graph and make a new graph.

Exponential Functions

The exponential function is a type of mathematical function which is used in real-world contexts. It helps to find out the exponential decay model or exponential growth model, in mathematical models. In this topic, we will understand descriptive rules, concepts, structures, graphs, interpreter series, work formulas, and examples of functions involving exponents.

Question

Two planes are gaining elevation at 6:00 am. Airplane #1 has an elevation of 12890 ft and climbs 1750 feet
every 5 minutes. Airplane #2 has an elevation of 6010 ft and climbs 1650 feet every 3 minutes.
Let t represent the time in minutes since 6:00 am, and let E represent the elevation in feet. Write the
Linear functions for the elevations of each plane in terms of t.
plane #1: E(t) =
|3D
plane #2: E(t):
How long after 6:00 am will the planes have the same elevation?
minutes
What is the elevation at that time?
feet

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