Want to create interactive content? Itβs easy in Genially!
24/25 EHE - Best buy & Proportion
thomas.payne
Created on October 11, 2023
Start designing with a free template
Discover more than 1500 professional designs like these:
Transcript
Best BUy & Proportion
y dπ₯
Srinivasa Ramanujan (1887 β 1920) grew up in India, where he received very little formal education in mathematics. Yet, he managed to develop new ideas in complete isolation, while working as a clerk in a small shop. After a few failed attempts to contact other mathematicians, he wrote a letter to the famous G.H. Hardy. Hardy immediately recognised Ramanujan's genius, and arranged for him to travel to Cambridge in England. Together, they made numerous discoveries in number theory, analysis, and infinite series. Unfortunately, Ramanujan soon fell ill and was forced to return to India, where he died at the age of 32. During his short life, Ramanujan proved over 3000 theorems and equations, on a wide range of topics. His work created entirely new areas of maths, and his notebooks were studied by other mathematicians for many decades after his death.
b2-4ac
A = lw
AS
https://drive.google.com/file/d/1cw-5LkBKjywGEAnNUU7bDLDsUHd4x1ia/view?usp=sharing
Quizizz - 8Qs14
Pin: 8990 0590
Challenge
joinmyquiz.com
1. Angles around a point add up to? 2. Simplify 20ab/5a 3. 1.34 Γ 20 4. 102 5. Round 0.004417 to 2 s.f. 6. What is 0.75hrs in minutes? 7. - 9 Γ - 8 + 5 8. What is 3% of Β£25?
y dπ₯
b2-4ac
A = lw
AS
Proportion
y dπ₯
b2-4ac
A = lw
AS
Proportion
y dπ₯
b2-4ac
A = lw
AS
Proportion
y dπ₯
b2-4ac
A = lw
AS
Proportion
y dπ₯
b2-4ac
A = lw
AS
Proportion - Past Paper Q's
y dπ₯
1)
b2-4ac
A = lw
2)
AS
Proportion - Using ratio
y dπ₯
b2-4ac
A = lw
AS
Proportion - Past Paper Q's
1)
y dπ₯
b2-4ac
A = lw
2)
AS
Best buy
y dπ₯
b2-4ac
A = lw
AS
Best buy
y dπ₯
b2-4ac
A = lw
AS
Best buy
y dπ₯
b2-4ac
A = lw
AS
y dπ₯
b2-4ac
A = lw
AS
y dπ₯
b2-4ac
A = lw
AS
Proportion & BEst Buy
y dπ₯
Century Tasks
b2-4ac
Direct Proportion 1: Conversions [MF16.05]
01
A = lw
Direct Proportion 2: y = kx [MF16.06]
02
Head to 'my courses'
Click on this one
Then search for the nugget.
03
Better Value [MF16.04]
Inverse Proportion 1: Introduction [MF16.07] + Inverse Proportion 2: y = k/x [MF16.08]
AS
Ext
y dπ₯
b2-4ac
A = lw
AS
y dπ₯
b2-4ac
A = lw
AS
https://drive.google.com/file/d/1cw-5LkBKjywGEAnNUU7bDLDsUHd4x1ia/view?usp=sharing
y dπ₯
b2-4ac
A = lw
AS
https://drive.google.com/file/d/1cw-5LkBKjywGEAnNUU7bDLDsUHd4x1ia/view?usp=sharing
y dπ₯
b2-4ac
A = lw
AS
https://drive.google.com/file/d/1cw-5LkBKjywGEAnNUU7bDLDsUHd4x1ia/view?usp=sharing
A Level
Higher
Foundation
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
A Level
Higher
Foundation
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
A Level
Higher
Foundation
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
A Level
Higher
Foundation
A Level
Higher
Foundation
A Level
Higher
Foundation
A Level
Higher
Foundation
A Level
Higher
Foundation
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
A Level
Higher
Foundation
A Level
Higher
Foundation
A Level
Higher
Foundation
A Level
Higher
Foundation
A Level
Higher
Foundation
A Level
Higher
Foundation
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
A Level
Higher
Foundation
A Level
Higher
Foundation
Challenge if finished early:
Find the Volume of the Triangular Prism:
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
A Level
Higher
Foundation
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
A Level
Higher
Foundation
b2-4ac
dy
dx
f(π₯+a)
y dπ₯
Logs
A Level
Higher
Foundation