MATH 105 • Final • Diferansiyel ve İntegral Matematik I
İstinye biz geldik! Üniversitedeki zor Matematik derslerinden biri olarak kabul edilen Math 105 dersi artık düşündüğün kadar zor değil! Dersimizde önce özet konu anlatımları ve kitaptaki ödev sorularının çözümleriyle öğrenecek, sonrasında son yılların çıkmış sınav sorularıyla antreman yapabileceksin.
Eğitmenler
Dorukhan Özcan
Co-Founder & CEO
Unicourse şirketinin kurucu ortağıyım. 2016 senesinde Galatasaray Lisesinden mezun oldum. Geçtiğimiz dört sene içerisinde 2000 saatten fazla ders anlattım. Anlattığım dersler sırasıyla; Calculus, Çok değişkenli Calculus, Lineer Cebir, Differansiyel Denklemler, Uygulamalı İstatistik ve Stokastik Modelleme dersleridir. Doping Hafıza şirketinde 2017 - 2022 seneleri arasında CEO danışmanlığı yaptım. Koç Üniversitesi Endüstri Mühendisliği ve Ekonomi çift anadal programını tam burslu olarak, 3.96/4.00 not ortalamasıyla bitirdim. Kadıköy Modalıyım.
Tolga Temiz
Eğitmen
2016 senesinde başladığım Koç Üniversitesi Matematik bölümünden 2020 senesinde fakülte üçüncüsü olarak mezun oldum. Lisans ve yüksek lisans eğitimlerim boyunca çeşitli derslerde asistanlık yaptım. 2021'de Koç Üniversitesi'nde Matematik yüksek lisansına başladım ve 2023 yılında mezun oldum. Şimdi Michigan State Üniversitesi'nde doktora yapıyorum. Topoloji alanıyla ilgilenmekteyim.
Kerem Başol
Eğitmen
2019 senesinde Koç Üniversitesi Matematik bölümüne başladım. Geçtiğimiz senelerde Calculus ve Linear Algebra derslerinde Tutor ve Teaching Assistant pozisyonlarında görev aldım. Halen Koç Üniversitesi Matematik ve Bilgisayar Mühendisliği çift anadal programını 4.00/4.00 ortalamayla fakülte birincisi olarak sürdürüyorum. Trigonometrik fonksiyonların elips üzerinde nasıl tanımlanabileceğini merak etmemle başlayan Matematik tutkumu aktarmak için Unicourse Matematik Zümresine katıldım.
Unicourse Garantisi
Bu dersi alma kararını senin için kolaylaştıralım. Eğer memnun kalmazsan 30 gün içinde bize ulaş, 3'ten fazla içerik tamamlamadıysan iade alabilirsin. Koşullar
Konular
Derivative of Inverse Function
Derivative of Inverse
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Logarithmic Differentiation
Logarithmic Differentiation I
Logarithmic Differentiation II
Exam like Question 1-2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Exam like Question 8
The Mean Value Theorem
Mean Value Theorem I
Mean Value Theorem II
Mean Value Theorem III
Mean Value Theorem IV
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Extreme Values and Critical Points
Critical Points, Absolute Maximum & Minimum
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Concavity and Inflections
First Derivative Test & Extremum Values
Second Derivative & Concavity
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Curve Sketching
Curve Sketching I
Curve Sketching II
Curve Sketching III
Exam like Question 1
Exam like Question 2
Exam like Question 3
Optimization (Extreme Value) Problems
Optimization Problems I
Optimization Problems II
Optimization Problems III
Optimization Problems IV
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Exam like Question 8
Exam like Question 9
Exam like Question 10
Exam like Question 11
Exam like Question 12
Challenging Problem
Indeterminate Forms (L'Hopital's Rule)
Indeterminate Form 1 (0/0)
Indeterminate Form 2 (∞/∞)
Indeterminate Form 3 (0 x ∞)
Indeterminate Form 4 (∞ - ∞)
Indeterminate Form 5 (0^0)
Indeterminate Form 6 (∞^0)
Indeterminate Form 7 (1 ^ ∞)
Antiderivative & Integration Rules
Integration Rules I
Integration Rules II
Integral of Trigonometric Functions I
Integral of Trigonometric Functions II
Integral of Exponential Functions
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Integration with Substitution
Integration with Substitution
Substitution with Logarithms & Exponentials I
Substitution with Logarithms & Exponentials II
Substitution with Trigonometric Functions 1
Substitution with Trigonometric Functions 2
Substitution with Trigonometric Functions 3
Substitution with Trigonometric Functions 4
Exam like Question 1
Exam like Question 2-3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Exam like Question 8
Exam like Question 9
Exam like Question 10
Area between Curves
Area between Curves 1
Area vs Integral
Area Between Curves 2
Area Between Curves 3
Area Between Curves 4
Area Between Curves 5
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Integrals (using areas of known functions)
Fundamental Theorem of Calculus
Fundamental Theorem of Calculus I
Fundamental Theorem of Calculus II
FTC with Area Perspective
FTC with Extreme Values
FTC and L'Hospital's Rule
Exam like Question 1-2-3
Fundamental Th. of Calculus
Fundamental Th. of Calculus
Fundamental Th. of Calculus
Fundamental Th. of Calculus
FTC and L'Hospital's Rule
FTC and L'Hospital's Rule
Integration by Parts
Integration by Part I
Integration by Part II
Integration by Part III
Integration by Part IV
Integration By Part V
Faster Method for Integration by Part
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Exam like Question 8
Integration with Partial Fractions
Partial Fractions I
Partial Fractions II
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Inverse Trigonometric Substitution
Inverse Trigonometric Substitution I
Inverse Trigonometric Substitution II
Exam like Question 1
Exam like Question 2
Exam like Question 3
Volume by Integration
Solids of Revolution-1
Solid of Revolution 2
Solid of Revolution 3
Solid of Revolution 4
Solid of Revolution 5
Volume: Solid of Revolution
Volume by Integration
Volume by Integration
Volume by Integration
(NEW) General Exam Review Part I
Derivative of Inverse
Logarithmic Differentiation
Absolute Extrema On a Closed Interval
Curve Sketching
Optimization Problem
L'Hopital's Rule
L'Hopital's Rule
L'Hôpital's Rule
L'Hopital's Rule
FTC and L'Hopital's Rule
FTC and L'Hopital's Rule
FTC and Tangent Line
(NEW) General Exam Review Part II
Integration by Substitution
Integration by Substitution
Integration Rules (By Part, Fractions, Substitution)
Integration Rules (By Part, Fractions, Substitution)
Integration by Part
Integration by Part
Integration by Part
Integration by Part
Partial Fractions
Partial Fractions
Partial Fractions
Partial Fractions
Partial Fractions & Substitution
Partial Fractions & Integration by Part
Inverse Trigonometric Substitution
Inverse Trigonometric Substitution
Inverse Trigonometric Substitution
FTC and L'Hopital's Rule
FTC and L'Hopital's Rule
FTC and Tangent Line
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Integrals (using areas of known functions)
Volume by Integration
Volume by Integration
Volume by Integration
Volume by Integration
Değerlendirmeler
Henüz hiç değerlendirme yok.
Sıkça Sorulan Sorular
Örneğin, Koç Üniversitesi - MATH 101 (Calculus) veya başka bir okulun benzer dersi olsun, paketlerimiz tam da o derse göre tasarlanır. Böylece nokta atışı çalışır, zaman kazanırsın.
Sınava özel videolar —konu anlatımları, çıkmış sorular ve çözümleri, özet notlar—içerir. Sınavda sıkça çıkan soruları hedefler. Eğitmenlerimiz, üniversitenin akademik takvimini takip ederek paketleri sürekli günceller. Böylece, gereksiz detaylarla vakit kaybetmeden başarını artırmaya odaklanabilirsin.
Ders İçeriği
Derivative of Inverse Function
Derivative of Inverse
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Logarithmic Differentiation
Logarithmic Differentiation I
Logarithmic Differentiation II
Exam like Question 1-2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Exam like Question 8
The Mean Value Theorem
Mean Value Theorem I
Mean Value Theorem II
Mean Value Theorem III
Mean Value Theorem IV
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Extreme Values and Critical Points
Critical Points, Absolute Maximum & Minimum
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Concavity and Inflections
First Derivative Test & Extremum Values
Second Derivative & Concavity
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Curve Sketching
Curve Sketching I
Curve Sketching II
Curve Sketching III
Exam like Question 1
Exam like Question 2
Exam like Question 3
Optimization (Extreme Value) Problems
Optimization Problems I
Optimization Problems II
Optimization Problems III
Optimization Problems IV
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Exam like Question 8
Exam like Question 9
Exam like Question 10
Exam like Question 11
Exam like Question 12
Challenging Problem
Indeterminate Forms (L'Hopital's Rule)
Indeterminate Form 1 (0/0)
Indeterminate Form 2 (∞/∞)
Indeterminate Form 3 (0 x ∞)
Indeterminate Form 4 (∞ - ∞)
Indeterminate Form 5 (0^0)
Indeterminate Form 6 (∞^0)
Indeterminate Form 7 (1 ^ ∞)
Antiderivative & Integration Rules
Integration Rules I
Integration Rules II
Integral of Trigonometric Functions I
Integral of Trigonometric Functions II
Integral of Exponential Functions
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Integration with Substitution
Integration with Substitution
Substitution with Logarithms & Exponentials I
Substitution with Logarithms & Exponentials II
Substitution with Trigonometric Functions 1
Substitution with Trigonometric Functions 2
Substitution with Trigonometric Functions 3
Substitution with Trigonometric Functions 4
Exam like Question 1
Exam like Question 2-3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Exam like Question 8
Exam like Question 9
Exam like Question 10
Area between Curves
Area between Curves 1
Area vs Integral
Area Between Curves 2
Area Between Curves 3
Area Between Curves 4
Area Between Curves 5
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Integrals (using areas of known functions)
Fundamental Theorem of Calculus
Fundamental Theorem of Calculus I
Fundamental Theorem of Calculus II
FTC with Area Perspective
FTC with Extreme Values
FTC and L'Hospital's Rule
Exam like Question 1-2-3
Fundamental Th. of Calculus
Fundamental Th. of Calculus
Fundamental Th. of Calculus
Fundamental Th. of Calculus
FTC and L'Hospital's Rule
FTC and L'Hospital's Rule
Integration by Parts
Integration by Part I
Integration by Part II
Integration by Part III
Integration by Part IV
Integration By Part V
Faster Method for Integration by Part
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Exam like Question 7
Exam like Question 8
Integration with Partial Fractions
Partial Fractions I
Partial Fractions II
Exam like Question 1
Exam like Question 2
Exam like Question 3
Exam like Question 4
Exam like Question 5
Exam like Question 6
Inverse Trigonometric Substitution
Inverse Trigonometric Substitution I
Inverse Trigonometric Substitution II
Exam like Question 1
Exam like Question 2
Exam like Question 3
Volume by Integration
Solids of Revolution-1
Solid of Revolution 2
Solid of Revolution 3
Solid of Revolution 4
Solid of Revolution 5
Volume: Solid of Revolution
Volume by Integration
Volume by Integration
Volume by Integration
(NEW) General Exam Review Part I
Derivative of Inverse
Logarithmic Differentiation
Absolute Extrema On a Closed Interval
Curve Sketching
Optimization Problem
L'Hopital's Rule
L'Hopital's Rule
L'Hôpital's Rule
L'Hopital's Rule
FTC and L'Hopital's Rule
FTC and L'Hopital's Rule
FTC and Tangent Line
(NEW) General Exam Review Part II
Integration by Substitution
Integration by Substitution
Integration Rules (By Part, Fractions, Substitution)
Integration Rules (By Part, Fractions, Substitution)
Integration by Part
Integration by Part
Integration by Part
Integration by Part
Partial Fractions
Partial Fractions
Partial Fractions
Partial Fractions
Partial Fractions & Substitution
Partial Fractions & Integration by Part
Inverse Trigonometric Substitution
Inverse Trigonometric Substitution
Inverse Trigonometric Substitution
FTC and L'Hopital's Rule
FTC and L'Hopital's Rule
FTC and Tangent Line
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Area between Curves
Integrals (using areas of known functions)
Volume by Integration
Volume by Integration
Volume by Integration
Volume by Integration
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